Search for supersymmetry in events with four or more leptons in s √ = 8 TeV pp collisions with the ATLAS detector
aa r X i v : . [ h e p - e x ] S e p EUROPEAN ORGANISATION FOR NUCLEAR RESEARCH (CERN)
CERN-PH-EP-2014-074
Submitted to: Phys. Rev. D
Search for supersymmetry in events with four or more leptonsin √ s = 8 TeV pp collisions with the ATLAS detector The ATLAS Collaboration
Abstract
Results from a search for supersymmetry in events with four or more leptons including electrons,muons and taus are presented. The analysis uses a data sample corresponding to 20.3 fb − ofproton-proton collisions delivered by the Large Hadron Collider at √ s = 8 TeV and recorded by theATLAS detector. Signal regions are designed to target supersymmetric scenarios that can be eitherenriched in or depleted of events involving the production of a Z boson. No significant deviations areobserved in data from standard model predictions and results are used to set upper limits on the eventyields from processes beyond the standard model. Exclusion limits at the 95% confidence level on themasses of relevant supersymmetric particles are obtained. In R -parity-violating simplified models withdecays of the lightest supersymmetric particle to electrons and muons, limits of 1350 and 750 GeVare placed on gluino and chargino masses, respectively. In R -parity-conserving simplified models withheavy neutralinos decaying to a massless lightest supersymmetric particle, heavy neutralino massesup to 620 GeV are excluded. Limits are also placed on other supersymmetric scenarios. c (cid:13) earch for supersymmetry in events with four or more leptons in √ s = 8 TeV pp collisions with the ATLAS detector The ATLAS Collaboration (Dated: September 4, 2014)Results from a search for supersymmetry in events with four or more leptons including electrons,muons and taus are presented. The analysis uses a data sample corresponding to 20.3 fb − ofproton-proton collisions delivered by the Large Hadron Collider at √ s = 8 TeV and recorded by theATLAS detector. Signal regions are designed to target supersymmetric scenarios that can be eitherenriched in or depleted of events involving the production of a Z boson. No significant deviationsare observed in data from standard model predictions and results are used to set upper limits on theevent yields from processes beyond the standard model. Exclusion limits at the 95% confidence levelon the masses of relevant supersymmetric particles are obtained. In R -parity-violating simplifiedmodels with decays of the lightest supersymmetric particle to electrons and muons, limits of 1350and 750 GeV are placed on gluino and chargino masses, respectively. In R -parity-conserving simpli-fied models with heavy neutralinos decaying to a massless lightest supersymmetric particle, heavyneutralino masses up to 620 GeV are excluded. Limits are also placed on other supersymmetricscenarios. PACS numbers: 12.60.Jv, 13.85.Rm, 14.80.Ly, 14.80.Nb
I. INTRODUCTION
Supersymmetry (SUSY) [1–9] is a space-time symme-try that postulates the existence of new SUSY particles,or sparticles, with spin ( S ) differing by one half-unit withrespect to their standard model (SM) partners. In super-symmetric extensions of the SM, each SM fermion (bo-son) is associated with a SUSY boson (fermion), havingthe same quantum numbers as its partner except for S .The scalar superpartners of the SM fermions are calledsfermions (comprising the sleptons, ˜ ℓ , the sneutrinos, ˜ ν ,and the squarks, ˜ q ), while the gluons have fermionic su-perpartners called gluinos (˜ g ). The SUSY partners ofthe Higgs and electroweak (EW) gauge bosons, knownas higgsinos, winos and the bino, mix to form the masseigenstates known as charginos ( ˜ χ ± l , l = 1 ,
2) and neu-tralinos ( ˜ χ m , m = 1 , ..., L ) and baryon ( B ) number [10, 11]:12 λ ijk L i L j ¯ E k + λ ′ ijk L i Q j ¯ D k + 12 λ ′′ ijk ¯ U i ¯ D j ¯ D k + κ i L i H , (1)where L i and Q i indicate the lepton and quark SU(2)-doublet superfields, respectively, while ¯ E i , ¯ U i and ¯ D i arethe corresponding singlet superfields. The indices i , j and k refer to quark and lepton generations. The HiggsSU(2)-doublet superfield H is the Higgs field that cou-ples to up-type quarks. The λ ijk , λ ′ ijk and λ ′′ ijk parame-ters are new Yukawa couplings, while the κ i parametershave dimensions of mass and vanish at the unificationscale.In the absence of a protective symmetry, L - and B -violating terms may allow for proton decay at a rate thatis in conflict with the tight experimental constraints onthe proton’s lifetime [12]. This difficulty can be avoided by imposing the conservation of R -parity [13–17], definedas P R = ( − B − L )+2 S . However, experimental boundson proton decay can also be evaded in R -parity-violating(RPV) scenarios, as long as the Lagrangian conserveseither L or B .In R -parity-conserving (RPC) models, the lightestSUSY particle (LSP) is stable and leptons can originatefrom unstable weakly interacting sparticles decaying intothe LSP. In RPV models, the LSP is unstable and decaysto SM particles, including charged leptons and neutri-nos when at least one of the λ ijk parameters is nonzero.Therefore, both the RPC and RPV SUSY scenarios canresult in signatures with large lepton multiplicities andsubstantial missing transverse momentum, which can beutilized to suppress SM background processes effectively.In this paper, it is assumed that the LSP is either thelightest neutralino ( ˜ χ ) or the neutral and weakly inter-acting superpartner of the graviton, the gravitino ( ˜ G ).A search for new physics is presented in final stateswith at least four isolated leptons, including electrons,muons and τ leptons (taus). Electrons and muonsare collectively referred to as “light leptons,” which in-clude those from leptonic tau decays, while taus refer tohadronically decaying taus in the rest of this paper. Fi-nal states with two, three or at least four light leptonsare considered, requiring at least two, one and zero taus,respectively. Events are further classified according tothe presence or absence of a Z boson candidate. In finalstates with four light leptons the backgrounds with fourprompt leptons ( ZZ/Zγ ∗ and t ¯ t + Z ) dominate; these areestimated using Monte Carlo (MC) simulations. On theother hand, in final states with taus the main backgroundarises from events where light-flavor jets are misidenti-fied as taus, and these are estimated with a data-drivenmethod.The analysis uses 20 . − of proton-proton collisiondata recorded in 2012 with the ATLAS detector at theLarge Hadron Collider (LHC) at a center-of-mass en-ergy of √ s = 8 TeV. Results are interpreted in terms ofmodel-independent limits on the event yields from newphysics processes leading to the given signature, as wellas in a variety of specific SUSY scenarios. These sce-narios include RPV and RPC simplified models, whichdescribe the interactions of a minimal set of particles, aswell as models with general gauge-mediated SUSY break-ing (GGM) [18, 19], which is a generalization of gauge-mediated SUSY breaking theories (GMSB) [20–25] wherethe parametrization does not depend on the details of theSUSY breaking mechanism.This analysis updates and extends results presentedpreviously by ATLAS [26]. Results from similar searchesinterpreted in RPV models have been reported by otherexperiments [27–33], while previous ATLAS searches re-quiring photons in the final state have constrained closelyrelated GGM models with different neutralino composi-tions [34, 35]. II. NEW PHYSICS SCENARIOS
Lepton-rich signatures are expected in a variety of newphysics scenarios. The SUSY models used for the in-terpretation of results from this analysis are describedbriefly below.
A. RPV simplified models
In the RPV simplified models used in this analysis, abinolike ˜ χ is assumed to decay into two charged leptonsand a neutrino via the λ ijk term in Eq. (1). The observedfinal-state signature is driven by this decay, but the crosssection and, to a lesser extent, the signal acceptance de-pend on the sparticle production mechanism. Four eventtopologies are tested, resulting from different choices forthe next-to-lightest SUSY particles (NLSPs): a chargino( ˜ χ ± ) NLSP; slepton NLSPs, referring to mass-degenerate˜ e , ˜ µ and ˜ τ sleptons; sneutrino NLSPs, referring to mass-degenerate ˜ ν e , ˜ ν µ and ˜ ν τ sneutrinos; and a gluino NLSP,the latter being a benchmark for how the experimen-tal reach may increase when strong production is intro-duced. In the slepton case, both the left-handed andright-handed sleptons (L-sleptons and R-sleptons, respec-tively) are considered, as the different production crosssections for the two cases substantially affect the analysissensitivity. The assumed decays of each NLSP choice aredescribed in Table I and illustrated in Fig. 1. All SUSYparticles are generated on shell, and forced to decay atthe primary vertex. The masses of the NLSP and LSPare varied; other sparticles are decoupled by assigningthem a fixed mass of 4 . χ ˜ χ is not considered, as the production cross section isfound to be negligible in most cases.The NLSP mass ranges explored are as follows: 500–1700 GeV for the gluino model, 200–1000 GeV for the TABLE I. Sparticle decays in the SUSY RPV simplified mod-els used in this analysis. The neutralino LSP is assumed todecay to two charged leptons and a neutrino. For the charginomodel, the W ± from the ˜ χ ± decay may be virtual.RPV Model NLSP DecayChargino ˜ χ ± → W ± ( ∗ ) ˜ χ L-slepton ˜ ℓ L → ℓ ˜ χ ˜ τ L → τ ˜ χ R-slepton ˜ ℓ R → ℓ ˜ χ ˜ τ R → τ ˜ χ Sneutrino ˜ ν ℓ → ν ℓ ˜ χ ˜ ν τ → ν τ ˜ χ Gluino ˜ g → q ¯ q ˜ χ q ∈ u, d, s, c (a) Chargino NLSP (b) R(L)-slepton NLSP(c) Sneutrino NLSP (d) Gluino NLSP FIG. 1. Representative diagrams for the RPV simplified mod-els considered in this analysis. chargino model, and 75–600 GeV for the slepton andsneutrino models. In each case, the choice of lower boundis guided by the limits from the previous searches at theLarge Electron Positron collider (LEP) and the Teva-tron; the production cross sections at those values lie be-tween 0.4 pb (chargino and R-slepton models) and 4.5 pb(gluino model). The upper bound is high enough thatthe production cross section is 0.1 fb or smaller in allcases. For a fixed value of m NLSP , m LSP is allowed tovary between 10 and m NLSP −
10 GeV. These lower andupper limits are designed to allow enough phase spacefor prompt decays of the LSP to SM particles and of theNLSP to the LSP, respectively.
TABLE II. Sparticle decays in the SUSY RPC simplified mod-els used in this analysis. For Z boson decays, the gauge bosonmay be virtual.RPC Model DecayR-slepton ˜ χ , → ℓ ± ˜ ℓ ∓ R → ℓ + ℓ − ˜ χ Stau ˜ χ , → τ ∓ ˜ τ ± → τ ∓ τ ± ˜ χ Z ˜ χ , → Z ( ∗ ) ˜ χ → ℓ ± ℓ ∓ ˜ χ B. RPC simplified models
Simplified models with R -parity conservation assumethe pair production of degenerate higgsinolike ˜ χ and ˜ χ .These decay to a binolike ˜ χ LSP via a cascade, resultingalso in the production of charged leptons.Three decay chains for the ˜ χ and ˜ χ are considered(see also Table II and Fig. 2): a light-lepton-rich “R-slepton RPC” scenario, with intermediate right-handedsmuons and selectrons; a tau-rich “stau RPC” scenario,with intermediate right-handed staus; and a lepton-rich“ Z RPC” scenario, with intermediate Z bosons. Thechoice of right-handed sleptons in the decay chain en-sures a high four-lepton yield, while suppressing the lep-tonic branching fraction of any associated chargino, thusenhancing the rate of four-lepton events with respect toevents with lower lepton multiplicities. In more realisticmodels, mixing occurs among the four neutralino states,leading to a small wino component. This component en-sures equal branching ratios to selectrons and smuons, asassumed in the R-slepton model. The simplified modelassumes the same neutralino branching fraction to bothsleptons.Masses between 100 and 700 GeV are considered forthe ˜ χ and ˜ χ , with production cross sections varyingfrom approximately 1.7 pb to 0.2 fb over this range. Inthe R-slepton model, the LSP mass is also varied, from0 up to m ˜ χ , −
20 GeV, while in the stau and Z modelsonly a massless LSP is considered. Where relevant, themasses of intermediate sparticles (sleptons and staus) inthe decay chains are assumed to be the average of the˜ χ , and ˜ χ masses; all other sparticles are decoupled. C. RPC GGM SUSY models
In all GGM scenarios the gravitino ˜ G is the LSP and,unlike GMSB SUSY models, the colored sparticles arenot required to be heavier than the electroweak sparti-cles, which allows for an enhanced discovery potentialat the LHC [18, 36]. The GGM parametrization uses thefollowing principal variables: the bino mass M , the winomass M , the gluino mass M , the higgsino mass param-eter µ , the ratio of the SUSY Higgs vacuum expectationvalues tan β , and the proper decay length of the NLSP, cτ NLSP .Two GGM scenarios are considered for this analy- (a) R-slepton RPC (b) Stau RPC(c) Z RPC
FIG. 2. Representative diagrams for the RPC simplified mod-els considered in this analysis. sis, one with tan β = 1.5 and the other with tan β = 30.For both it is assumed that M = M = 1 TeV and cτ NLSP < µ and m ˜ g = M are varied be-tween set values. As a result, both sets of models havehiggsinolike ˜ χ , ˜ χ and ˜ χ ± co-NLSPs. In the tan β = 1.5models, the neutralino NLSPs decay nearly exclusively(branching ratio ∼ Z boson plus a gravitino( ˜ χ → Z ˜ G ), while in the tan β = 30 models the NLSP canalso decay to a Higgs boson plus a gravitino ( ˜ χ → h ˜ G ),with an assumed Higgs boson mass of 125 GeV andHiggs boson branching ratios set to those of the SM.The branching ratio of NLSP decays to a Higgs bosonranges widely, from 0% for µ = 100 GeV to ∼
40% for µ = 500 GeV. Gluino masses of up to 1 . < µ < m ˜ g −
10 GeVis also made, where the lower limit excludes models withnonprompt sparticle decays. Production of strongly in-teracting sparticle pairs dominates across the bulk of theGGM parameter space, but as the gluino mass increases,production of weakly interacting sparticles becomes moreimportant. Representative diagrams for the relevant pro-cesses are shown in Fig. 3. The total SUSY productioncross section in both models varies from 1.2–1.9 pb for m ˜ g = 600 GeV to 3.1 fb for the highest masses consid-ered. However, for µ = 200 GeV the cross section neverfalls below 0.6 pb, due to contributions from ˜ χ , ˜ χ ± and˜ χ production. III. THE ATLAS DETECTOR
The ATLAS detector [37] is a multipurpose particlephysics detector with forward-backward symmetric cylin- (a) Weak production GGM (b) Strong production GGM
FIG. 3. Representative diagrams of relevant processes forGGM models considered in this analysis. drical geometry [38]. The inner tracking detector (ID)consists of a silicon pixel detector, a silicon microstripdetector, and a transition radiation tracker (TRT), andcovers pseudorapidities of | η | < | η | < < | η | < < | η | < | η | < | η | < | η | < IV. MONTE CARLO SIMULATIONS
MC simulations are used to aid in the description ofSM backgrounds and to model the SUSY signals. Detailsof the MC generation are listed in Table III. When theparton shower is generated with HERWIG-6.520 [40], theunderlying event is simulated by JIMMY-4.31 [41]. Allsamples are processed using the full ATLAS detector sim-ulation [42] based on GEANT4 [43], except for the tW Z , tZ and W/ZH ( → µµ ) samples, which are instead simu-lated with a parametrization of the performance of theATLAS electromagnetic and hadronic calorimeters andwith GEANT4 for other detector components [44]. Theeffect of multiple proton-proton interactions in the sameor nearby bunch crossings (pileup) is taken into accountin all MC simulations, and the distribution of the numberof interactions per bunch crossing in the MC simulationis reweighted to that observed in the data. Specific noteson some of the generated processes follow.The ZZ/Zγ ∗ and W Z/W γ ∗ diboson processes are sim-ulated using POWHEG [45–48], including off shell pho-ton contributions and internal conversion events wheretwo leptons are produced from photon radiation in the final state. The gg → ZZ/Zγ ∗ process is simulated sep-arately, but does not include the ZZ/Zγ ∗ → τ process,which is estimated to be negligible in the signal regionsused in this analysis. Triboson processes are also gener-ated, including those with six electroweak vertices anda V V +2-jet final state, where V is a W or Z boson,as indicated in Table III. Five mechanisms are consid-ered for SM Higgs boson production ( m H = 125 GeVassumed) which can give rise to four or more leptons inthe final state: gluon fusion (ggF); vector-boson fusion(VBF); associated production with a W ( W H ) or Z bo-son ( ZH ); and associated production with a t ¯ t pair ( t ¯ tH ).Top quark samples are generated assuming a top quarkmass of 172 . ∼
2% [54–56]. The nominal cross sec-tion and its uncertainty are taken from an envelope ofcross section predictions using different parton densityfunction (PDF) sets and factorization and renormaliza-tion scales, as described in Ref. [57]. For all models, addi-tional MC samples are generated to test how the event ac-ceptance varies with modified initial- and final-state radi-ation (ISR/FSR), and renormalization and factorizationscales. MadGraph is used to generate these additionalsamples for the RPV and RPC simplified models, whilePYTHIA-6.426 [58] is used for the GGM models.
V. EVENT RECONSTRUCTION ANDPRESELECTION
For all physics channels considered in this analysis, in-cluding those with one or more taus in the final state,events are required to pass at least one of a selection ofsingle isolated or double electron/muon triggers. Doublelepton triggers have asymmetric or symmetric transversemomentum and energy ( p T and E T ) thresholds, depend-ing on the lepton flavors involved. Thresholds on the p T or E T of reconstructed leptons matching the triggeringobjects are chosen to ensure that the trigger efficiencyis high and independent of the lepton p T or E T ; thesethresholds are listed in Table IV. Triggering is restrictedto | η | < | η | < p T >
400 MeV associated with it. The vertexwith the highest scalar sum of the squared transverse
TABLE III. The MC-simulated samples used in this paper. The generators and the parton shower they are interfaced to, crosssection predictions used for yield normalization, tunes used for the underlying event (UE) and PDF sets are shown. Wheretwo PDF sets are given, the second refers to the generator used for fragmentation and hadronization. Samples preceededby (S) are used for systematic studies only, and “HF” refers to heavy-flavor jet production. Cross sections are calculated atleading-order (LO), NLO, next-to-next-to-LO (NNLO) and next-to-next-to-leading-logarithm (NNLL) QCD precision. Certainsamples include NLO EW corrections in the calculation. See text for further details of the event generation and simulation.
Process Generator Cross section UE tune PDF set+ fragmentation/hadronization calculation
Dibosons
W W , W Z/W γ ∗ , ZZ/Zγ ∗ POWHEG-BOX-1.0 [45–48] NLO AU2 [59] CT10 [60]+ PYTHIA-8.165 [61] with MCFM-6.2 [62, 63](S)
ZZ/Zγ ∗ [email protected] [64] MCFM-6.2 [62, 63] AUET2B [65] CT10 ZZ/Zγ ∗ via gluon fusion gg2ZZ [66] + HERWIG-6.520 [40] NLO AUET2B CT10/CTEQ6L1 Tribosons
W W W , ZW W , ZZZ
MadGraph-5.0 [67] + PYTHIA-6.426 [58] NLO [68] AUET2B CTEQ6L1 [69]
V V + 2 jets SHERPA-1.4.0 [70] LO SHERPA default CT10
Higgs via gluon fusion POWHEG-BOX-1.0 [71] + PYTHIA-8.165 NNLL QCD, NLO EW [72] AU2 CT10via vector boson fusion POWHEG-BOX-1.0 [73] + PYTHIA-8.165 NNLO QCD, NLO EW [72] AU2 CT10associated W / Z PYTHIA-8.165 NNLO QCD, NLO EW [72] AU2 CTEQ6L1associated t ¯ t PYTHIA-8.165 NLO [72] AU2 CTEQ6L1
Top+Boson t ¯ t + W , t ¯ t + Z ALPGEN-2.14 [74] + HERWIG-6.520 NLO [75, 76] AUET2B CTEQ6L1(S) t ¯ t + Z MadGraph-5.0 + PYTHIA-6.426 NLO [75] AUET2B CTEQ6L1 t ¯ t + W W , tZ , tW Z MadGraph-5.0 + PYTHIA-6.426 LO AUET2B CTEQ6L1 t ¯ t POWHEG-BOX-1.0 [77] + PYTHIA-6.426 NNLO+NNLL [78–83] Perugia 2011C [84] CT10/CTEQ6L1
Single top t -channel AcerMC-38 [85] NNLO+NNLL [86] AUET2B CTEQ6L1 s -channel, W t
[email protected] [87] NNLO+NNLL [88, 89] AUET2B CT10 W +jets, Z/γ ∗ +jets M ℓℓ >
40 GeV (30 GeV HF) ALPGEN-2.14 + PYTHIA-6.426 with DYNNLO-1.1 [90] Perugia 2011C CTEQ6L110 GeV < M ℓℓ <
40 GeV ALPGEN-2.14 + HERWIG-6.520 with MSTW2008 NNLO [91] AUET2B CTEQ6L1
Multijet
PYTHIA-8.165 LO AU2 CTEQ6L1
SUSY signal
RPV simplified models HERWIG++ 2.5.2 [92] See text UE-EE-3 [93] CTEQ6L1RPC simplified models MadGraph-5.0 + PYTHIA-6.426 NLO, see text AUET2B CTEQ6L1GGM PYTHIA-6.426 NLO, see text AUET2B CTEQ6L1
TABLE IV. Offline p T and E T thresholds used in this analysisfor different trigger channels. For dilepton triggers, the twonumbers refer to the leading and subleading triggered lepton,respectively.Trigger channel p T or E T threshold [GeV]Single isolated e/µ e
14, 1425, 10Double µ
14, 1418, 10 e + µ e ), 10( µ )18( µ ), 10( e ) momenta of associated tracks is taken to be the primaryvertex of the event.Candidate electrons must satisfy the “medium” iden-tification criteria, following Ref. [94] and modified for2012 operating conditions, and have | η | < E T >
10 GeV, where E T and | η | are determined from thecalibrated clustered energy deposits in the electromag-netic calorimeter and the matched ID track, respec-tively. Muon candidates are reconstructed by combin-ing tracks in the ID and the MS [95], and have | η | < p T >
10 GeV. The quality of the ID track associ-ated with a muon is ensured by imposing requirementsdescribed in Ref. [96].Jets are reconstructed with the anti- k t algorithm [97]with a radius parameter of R = 0.4 using three-dimensional calorimeter energy clusters [98] as input.The clusters are calibrated using “local cluster weight-ing” calibration, where the energy deposits arising fromelectromagnetic and hadronic showers are independentlycalibrated [99]. The final jet energy calibration correctsthe calorimeter response to the true particle-level jet en-ergy [99, 100]. The correction factors are obtained fromsimulation and are refined and validated using data. Anadditional correction subtracts the expected contamina-tion from pileup, calculated as a product of the jet areaand the average energy density of the event [101]. Eventscontaining jets failing to satisfy the quality criteria de-scribed in Ref. [99] are rejected to suppress events withlarge calorimeter noise or noncollision backgrounds. Jetsare required to have p T >
20 GeV and | η | < b -quark (“ b -tagged”)using a multivariate technique based on quantities suchas the impact parameters of the tracks associated witha reconstructed secondary vertex. For this analysis, the b -tagging algorithm [102] is configured to achieve an ef-ficiency of 80% for correctly identifying b -quark jets in asimulated sample of t ¯ t events.Tau candidates are reconstructed using calorimeter“seed” jets with p T >
10 GeV and | η | < R ≡ p (∆ φ ) + (∆ η ) = 0 . η -and p T -dependent calibration [103]. In this analysis, one-or three-prong tau decays are selected if they have unitcharge, p T >
20 GeV, and | η | < R . Objects areremoved at each step in the procedure before movingon to the next. If two candidate electrons are identi-fied within ∆ R = 0.05 of each other, the lower energyelectron is discarded. If a candidate electron and a can-didate jet are within ∆ R = 0.2 of each other, the jet isdiscarded. All leptons are required to be separated bymore than ∆ R = 0.4 from the closest remaining jet. Inthe rare occurrence when a candidate electron overlapswith a candidate muon within ∆ R = 0.01, both particlesare discarded since it usually means that they were recon-structed using the same track. Similarly, if two muons areseparated by less than ∆ R = 0.05 then they are unlikelyto be well reconstructed, and both are removed. Can-didate taus are required to be separated by more than∆ R = 0.2 from the closest electron or muon; otherwisethe tau is discarded.Candidate objects that are not removed by the aboveprocedure are classified as “baseline.” “Signal” objectsare baseline objects that also satisfy additional criteriadescribed in the following.Signal light leptons are required to originate from theprimary vertex, with a closest approach in the trans-verse plane of less than five (three) standard devia-tions and a longitudinal distance z satisfying | z sin θ | < p T >
400 MeV(1 GeV) within a cone of radius ∆ R = 0.3 around eachbaseline electron (muon), excluding the track of the lep-ton itself. Calorimeter isolation is calculated, for elec- trons only, by summing the transverse energies of topo-logical clusters within a radius of ∆ R = 0.3 around theelectron, and it is corrected for the effects of pileup. Inorder to maintain sensitivity to some RPV scenarios withhighly boosted particles, contributions to the lepton iso-lation from tracks or clusters of other electron and muoncandidates that satisfy all signal criteria, except the isola-tion requirements, are removed. The track isolation mustbe less than 16% (12%) of the electron’s E T (muon’s p T ),and the calorimeter isolation for electrons must be lessthan 18% of the electron’s E T .Signal jets are baseline jets with | η | < .
5. Addition-ally, in order to suppress jets from a different interactionin the same beam bunch crossing, a jet with p T <
50 GeVis discarded if more than half of the p T -weighted sum ofits tracks does not come from the tracks which are asso-ciated with the primary vertex.Signal taus must satisfy the “medium” identificationcriteria of a boosted decision tree [104] algorithm, basedon various track and cluster variables for particle discrim-ination. Tau objects arising from misidentified electronsare discarded using a “loose” electron veto based on TRTand calorimeter information. A muon veto is also ap-plied. If a signal tau and a jet are within ∆ R = 0.2 ofeach other, the tau is kept while the jet is discarded.The missing transverse momentum vector, p missT , andits magnitude, E missT , are calculated from the transversemomenta of calibrated electrons, muons, photons andjets, as well as all the topological clusters with | η | < . E missT , which isfound not to adversely affect sensitivity to SUSY events.All particle selections are applied identically to dataand to the MC events. To account for minor differencesbetween data and MC simulation in the electron, muonand tau reconstruction and identification efficiencies, p T -and η -dependent scale factors derived from data in ded-icated regions are applied to signal leptons. Although b -tagging is not used to discriminate SUSY events from theSM background, it is used to compare the MC simulationof leptons arising from heavy-flavor jets to data. For thismeasurement, the b -tagging efficiency and mistag ratesare themselves adjusted by scale factors derived from t ¯ t and light-jets data in dedicated regions [106–108]. VI. SIGNAL REGIONS
Nine signal regions (SRs) are defined in order to givegood sensitivity to the SUSY signal models considered.The SRs require at least four leptons, and are classifieddepending on the number of light leptons required. Thenumber of light leptons can be equal to two, three or atleast four, with the corresponding number of taus in thesame regions required to be at least two, one or zero,respectively. Events with five or more leptons are not ve-toed, to retain potential signals with higher lepton mul-tiplicities.
TABLE V. The selection requirements for the signal regions, where ℓ = e, µ and “SFOS” indicates two same-flavor opposite-signlight leptons. The invariant mass of the candidate Z boson in the event selection can be constructed using two or more of thelight leptons present in the event: all possible lepton combinations are indicated for each signal region.N( ℓ ) N( τ ) Z -veto E missT [GeV] m eff [GeV]SR0noZa ≥ ≥ ℓ , SFOS+SFOS >
50 –SR1noZa =3 ≥ ℓ >
50 –SR2noZa =2 ≥ >
75 –SR0noZb ≥ ≥ ℓ , SFOS+SFOS >
75 or > ≥ ℓ >
100 or > ≥ >
100 or > ℓ ) N( τ ) Z -requirement E missT [GeV]SR0Z ≥ ≥ >
75 –SR1Z =3 ≥ >
100 –SR2Z =2 ≥ >
75 –
The SRs are further subdivided between those vetoingagainst the presence of a Z boson (“noZ” regions) andthose requiring the presence of one (“Z” regions). ThenoZ regions target signals from RPV and RPC simplifiedmodels, while the Z regions target the GGM and Z RPCmodels. The noZ regions are further divided into “noZa”regions, designed to target the RPC ˜ χ ˜ χ decays via an E missT selection, and “noZb” regions, optimized for RPVdecays and implementing a combination of selections on E missT and m eff , the latter defined as the scalar sum ofthe E missT , the p T of signal leptons and the p T of signaljets with p T >
40 GeV. The definitions of the differentSRs are given in Table V and discussed in more detailbelow.In four-lepton events with at least two light leptons,the dominant SM backgrounds are rich in Z bosons, suchas those from ZZ/Zγ ∗ and Z/γ ∗ +jets processes. Thesecan be suppressed by means of a “ Z -veto,” which rejectsevents where light-lepton combinations yield invariantmass values in the 81.2–101 . Z boson decays, combinations of an SFOS pair with an ad-ditional light lepton (SFOS+ ℓ ) and with a second SFOSpair (SFOS+SFOS) are also taken into account.For events that pass the Z -veto, two classes of sig-nal regions are defined: SR x noZa and SR x noZb, where x = 0 , , x noZa regions, a relatively soft requirement on E missT ( > χ ˜ χ signals, while in SR x noZb regions, inorder to improve sensitivity to signal, events are acceptedif they satisfy either a moderate requirement on E missT ( > m eff ( > x Z, where x = 0 , , Z RPC scenarios, all requiring the pres-ence of an SFOS light-lepton pair with invariant mass inthe 81.2–101 . Z boson decays in these regions.In the Z regions, an E missT selection is applied ( > Z + X events. VII. DETERMINATION OF THE STANDARDMODEL BACKGROUND
Several SM processes can mimic a four-lepton sig-nal. Backgrounds can be classified into “irreducible”processes (with at least four prompt leptons) and “re-ducible” processes (with fewer than four prompt lep-tons). “Nonprompt leptons” include leptons originat-ing from semileptonic decays in heavy-flavor jets or pho-ton conversions as well as misidentified light-flavor jets.Background events with fewer than two prompt leptonsare found to be negligible using MC simulation and arenot considered. The irreducible component of the back-ground (
ZZ/Zγ ∗ , ZW W , ZZZ , tW Z , t ¯ t + Z / W W , andHiggs boson decays) is estimated from simulation, whilethe relevant reducible background (
W W W , W Z/W γ ∗ , t ¯ t + W ; Z/γ ∗ +jets, t ¯ t , W t , W W ) is estimated from datausing the “weighting method.”In the weighting method, the number of reduciblebackground events in a given region is estimated fromdata using MC-based probabilities for a nonprompt lep-ton to pass or fail the signal lepton selection. Leptonsare first classified as “loose” or “tight,” based on isola-tion criteria and reconstruction quality. Loose leptons arebaseline leptons that fail any of the other requirementsimposed on signal leptons. Tight leptons coincide withsignal leptons as defined previously. The ratio F = f / ¯ f for nonprompt leptons defines the “fake ratio,” where f ( ¯ f ) is the probability that a nonprompt lepton is misiden-tified as a tight (loose) lepton.For each SR, two control regions (CRs) are used forthe extraction of the data-driven background predictions.The CR definitions only differ from that of their associ-ated SR in the quality of the required leptons: CR1 re-quires exactly three tight leptons and at least one looselepton; while CR2 requires exactly two tight leptons andat least two loose leptons.The number N SRred of background events with one ortwo nonprompt leptons from reducible sources in eachSR can then be determined from the number of events N CR1 and N CR2 in regions CR1 and CR2, respectively: N SRred = [ N CR1data − N CR1irr ] × F (2) − [ N CR2data − N CR2irr ] × F × F , where F is the uniquely defined fake ratio in CR1, while F and F are the two fake ratios that can be constructedusing the two loose leptons in CR2. The number of irre-ducible background events in CR1 and CR2, N CR1irr and N CR2irr , are subtracted from the corresponding number ofevents seen in data, N CR1data and N CR2data , and the resultingquantities are subtracted from one another so that eventswith two nonprompt leptons are not double-counted.Fake ratios are calculated from MC simulation, sep-arately for light-flavor jets, heavy-flavor jets (includingcharm) and photon conversions (electrons and taus only).For taus, light jets are separated further into quark- andgluon-jet categories. These categories are referred to as“fake types.” The fake ratios additionally depend on thelepton kinematics and the hard process producing thenonprompt lepton. The hard processes considered arethe following: t ¯ t ; Z/γ ∗ production in association withjets; W Z/W γ ∗ production; t ¯ t + Z production where onetop quark decays hadronically; and ZZ/Zγ ∗ productionwhere one lepton is either out of the acceptance or notreconstructed. For all lepton flavors, the dependence ofthe fake ratio on the lepton p T is taken into account.In addition, electron fake ratios are parametrized in | η | ,while tau fake ratios include the dependence on | η | andthe number of associated tracks (one or three).To account correctly for the relative abundances of faketypes and production processes, a weighted average F SR of fake ratios is computed in each SR, as F SR = X i,j (cid:16) R ij SR × s i × F ij (cid:17) . (3)The factor R ij SR is a “process fraction” that depends onthe process and fake type, which in each SR gives thefraction of nonprompt leptons of fake type i originatingfrom process category j , while F ij is the correspondingfake ratio, and the scale factor s i is a correction thatdepends on the fake type, as explained below.The process fractions are obtained from four-leptonMC events, appropriately taking into account the four-lepton yields and how the E missT and m eff selection effi-ciency depends on the process and fake type in the SR where the process fraction is calculated. Systematic un-certainties arising from the modeling of process fractionsare estimated by varying the nonprompt lepton abun-dances for each fake type and process by a factor of two.Scale factors are applied to the fake ratios to accountfor possible differences between data and simulation.These are assumed to be independent of the physical pro-cess, and are determined from data in dedicated regionsenriched in objects of a given fake type.For nonprompt light leptons from heavy-flavor jets,the scale factor is measured in a b ¯ b -dominated controlsample, which selects events with only one b -tagged jetcontaining a muon, and an additional baseline light lep-ton. The scale factors are found to be 0 . ± .
05 and0 . ± .
11 for electrons and muons respectively, whereboth the statistical and systematic uncertainties are in-cluded. The systematic uncertainty, for these and othermeasured scale factors, arises from uncertainties in thesubtraction of the background from the selected regionand variation of the selection criteria used to define theregion. For taus, the heavy-flavor scale factor cannot bereliably measured using data. Instead, it is assumed tovary within the same range as for other measured scalefactors, and a value of 1.0 ± p T and η , in a W +jets-dominated control sample, where events with one muonwith p T >
25 GeV and one baseline tau are selected, andevents with b -tagged jets are vetoed to suppress heavy-flavor contributions. The scale factors are close to unity(0.89–1.06, with uncertainties between 0.03 and 0.06) inthe lowest p T bin (20–30 GeV), and decrease to between0.5 and 0.6 at high p T [ O (100 GeV)].For electron candidates originating from photon con-versions, the scale factor is determined in a sample ofphotons from final-state radiation of Z boson decays tomuon pairs. The scale factor is found to be 1 . ± . ± p T . The p T -averaged fake ratios are in the range0.01–0.18 (0.09–0.24) for electrons (muons) and 0.02–0.15(0.004–0.04) for one-prong (three-prong) tau decays. VIII. BACKGROUND MODEL VALIDATION
Before data is inspected in the SRs, the adequacy of thereducible background model is tested by verifying agree-ment between data and SM background expectations.Six validation regions (VRs) are introduced for this pur-pose, defined by the selections listed in Table VI. Theyuse the same selection criteria as for the correspondingSRs, except that either one or both of E missT and m eff must lie below some predefined value, to ensure that SRsand VRs do not overlap and that signal contamination inthe VRs is minimal. In VRs applying a Z -veto, it is re-quired that E missT <
50 GeV and m eff <
400 GeV, whilein VRs with a Z boson requirement only E missT <
50 GeVis applied. The reducible background, which is significantin the one- and two-tau signal regions, has a similar com-position in the SRs and the corresponding VRs. On theother hand, the irreducible background can be substan-tially different between SRs and VRs, due to processeswith genuine E missT (especially t ¯ t + Z ), which are signif-icant in the SRs but negligible in the VRs. Thereforethe VRs are primarily used to validate the model for thereducible background estimation, as well as to test the ZZ/Zγ ∗ MC simulation. It was verified that contamina-tion in the VRs from the considered SUSY models is notsignificant.The background model adopted in the VRs is the sameas in the SRs, with the irreducible background obtainedfrom MC simulation and the reducible background esti-mated using the weighting method. The irreducible back-ground in the VRs is dominated by
ZZ/Zγ ∗ , Z/γ ∗ +jetsand W Z/W γ ∗ processes, depending on tau multiplic-ity. Observed and expected event yields in each VR areshown in Table VII, together with the corresponding CL b value [109]. Perfect agreement between expected and ob-served yields corresponds to a CL b value of 0.5, while val-ues approaching 0 or 1 indicate poor agreement. Goodagreement between data and SM background predictionsis observed in all regions, within statistical and system-atic uncertainties (which are discussed in Sec. IX).The E missT distributions in VR0Z and VR2Z are shownin Figs. 4(a) and 4(c), while the m eff distributions in thesame regions are shown in Figs. 4(b) and 4(d). VR0Zis dominated by irreducible backgrounds, in particular ZZ/Zγ ∗ events, with smaller contributions from Higgsboson and triboson processes, while VR2Z receives signif-icant contributions from reducible backgrounds, as wellas from ZZ/Zγ ∗ events. In both cases, the shapes of the E missT and m eff distributions are well described by thebackground estimate. Distributions are not shown forother VRs, where event yields are low.The t ¯ t + Z process is a significant component of theestimated background in the zero-tau signal regions, butit is small in all validation regions. The MC simulation ofthis process was tested in Ref. [110] and found to predictthe rate of the process well. Therefore, the MC predictionis used in this analysis, without further correction. IX. SYSTEMATIC UNCERTAINTIES
Several sources of systematic uncertainty are consid-ered for the SM background estimates and signal yields.In the zero-tau signal regions, the background is dom- inated by the irreducible component, and systematicuncertainties are dominated by theoretical uncertaintiesand by uncertainties stemming from the limited eventcounts in relevant MC samples. Moving to higher taumultiplicities, systematic uncertainties on the reduciblebackgrounds (mainly arising from nonprompt taus) be-come dominant. Correlations of systematic uncertaintiesbetween processes and signal/control regions are takeninto account when calculating the final uncertainties.The primary systematic sources, described below, aresummarized in Table VIII.Experimental systematic uncertainties on the jet en-ergy scale (JES) and resolution are determined using insitu techniques [99, 100]. The JES uncertainty includesuncertainties from the quark-gluon composition of thejets, the heavy-flavor fraction and pileup. Uncertaintieson the lepton identification efficiencies, energy scales andresolutions are determined using Z → ℓℓ events in data,where ℓ = e , µ or τ [94, 95, 103, 111]. Uncertainties onobject momenta are propagated to the E missT measure-ment, and additional uncertainties on E missT arising fromenergy deposits not associated with any reconstructedobjects are also included. The uncertainty on the lu-minosity is 2.8% [112]. A 5% uncertainty is applied toMC samples to cover differences in efficiency observedbetween the trigger in data and the MC trigger simula-tion.The relative uncertainty on the irreducible backgroundis approximately 30–50% in the noZ signal regions, de-creasing to 15–25% in the Z regions. It is dominatedby theoretical uncertainties in the cross sections and byuncertainties in the MC modeling of the irreducible pro-cesses. Theoretical uncertainties in the SM cross sec-tions include PDF uncertainties, estimated using varia-tions of appropriate PDF sets, and uncertainties in theQCD modeling, estimated by varying the factorizationand renormalization scales individually by factors of onehalf and two. Uncertainties on the kinematic accep-tance of E missT and m eff selections arising from the choiceof MC generator are estimated by comparisons betweenPOWHEG and aMC@NLO for ZZ/Zγ ∗ processes, andbetween ALPGEN and MadGraph for t ¯ t + Z . Uncertain-ties on the acceptance are not considered for the V V V and tW Z processes, which represent a small contributionto the SR yields. Uncertainties arising from the choiceof generator are approximately 5–20% for
ZZ/Zγ ∗ pro-cesses, and 30–40% for t ¯ t + Z in SRs with no taus re-quired, where this background is important.Uncertainties on the background estimate due to lim-ited statistics of the MC-simulated samples range from afew percent up to 20–30%.Relative uncertainties on the reducible backgrounds,as extracted from the weighting method, are of the orderof 100% in all zero-tau signal regions, and in the range ofapproximately 30–45% (35–50%) in regions with at leastone (at least two) taus in the final state. They are dom-inated by the systematic uncertainties on the weightingmethod and statistical uncertainties in the data control0 TABLE VI. Summary of the selection requirements that define the six validation regions used in the analysis.N( ℓ ) N( τ ) Z -veto E missT [GeV] m eff [GeV]VR0noZ ≥ ≥ ℓ , SFOS+SFOS < < ≥ ℓ < < ≥ < < ℓ ) N( τ ) Z -requirement E missT [GeV]VR0Z ≥ ≥ <
50 –VR1Z =3 ≥ <
50 –VR2Z =2 ≥ <
50 –TABLE VII. Observed and expected event yields in the six validation regions. Both the statistical and systematic uncertaintiesare included, also taking into account correlations between irreducible and reducible backgrounds. The CL b value is also quotedfor each region. ZZ/Zγ ∗ tW Z t ¯ t + Z V V V
Higgs Reducible Σ SM Data CL b VR0noZ 3 . ± . . ± .
010 0 . +0 . − . . +0 . − . . ± .
13 0 . +0 . − . . ± . . . ± .
27 0 . ± .
006 0 . ± .
022 0 . ± .
029 0 . ± .
19 7 . +1 . − . . +1 . − . . . +0 . − . . ± .
004 0 . +0 . − . . ± .
020 0 . ± .
13 33 . +3 . − . . +3 . − .
32 0 . +20 − . ± .
07 1 . ± . . ± .
33 4 . ± . . +3 . − . +21 −
216 0 . . ± . . ± .
021 0 . ± .
11 0 . ± .
08 0 . ± .
16 21 ± ± . . +1 . − . . ± . . +0 . − . . ± .
013 0 . ± .
14 90 +8 − +8 −
101 0 . TABLE VIII. Principal experimental and theoretical system-atic uncertainties for the irreducible and reducible backgroundestimation. For experimental uncertainties, the largest valuein any SR is quoted. For theoretical uncertainties, σ indi-cates an uncertainty on the production cross section, while Aǫ indicates an uncertainty on the product of acceptance andefficiency. The uncertainty on the reducible background is in-dicated as a function of the number of taus required in thefinal state.Experimental TheoreticalJet energy scale 2.4% σ : t ¯ t + Z / W W [75, 76] 30%Jet energy resolution Aǫ : t ¯ t + Z σ : ZZ/Zγ ∗ e efficiency 3.5% Aǫ : ZZ/Zγ ∗ τ efficiency 3.3% σ : V V V / tW Z E missT energy scale 2.7% σAǫ : V H /VBF [72] 20% E missT resolution 2.7% σAǫ : ggF/ t ¯ tH [72] 100%Luminosity 2.8% ReducibleTrigger 5% ≥ τ SRs ∼ < ∼ ≥ τ / τ SRs 30–50% regions. The systematic uncertainties include results ofa closure test where the weighting method was appliedto MC-simulated events and compared with the MC re-ducible background estimation, as well as uncertaintieson the fake ratios.Systematic uncertainties on the SUSY signal yieldsfrom experimental sources typically lie in the 5–20%range. They are usually dominated by the uncertainty onthe electron identification and reconstruction efficiency, the electron energy scale, the JES, and the E missT energyscale and resolution. They include the uncertainties onthe signal acceptance, which are typically of the orderof a few percent and usually smaller than 10%. The ef-fect of ISR/FSR uncertainties on the signal acceptanceis estimated by comparing samples generated with dif-ferent amounts of ISR/FSR. Theoretical uncertainties oncross sections are typically of the order of 10% but canreach values of approximately 30–40% for gluino produc-tion. Uncertainties due to limited statistics of the MC-simulated samples are usually less than 20–30%. X. RESULTS
The number of events observed in each signal region isreported in Table IX, together with background predic-tions. Upper limits at 95% confidence level (CL) on thenumber of events originating from beyond-the-SM (BSM)phenomena for each signal region are derived using theCL s prescription [109] and neglecting any possible sig-nal contamination in the control regions. These limitsare calculated in a profile likelihood fit [113], where thenumber of events observed in the signal region is addedas an input to the fit, and an additional parameter forthe strength of any BSM signal, constrained to be non-negative, is derived from the fit. All systematic uncer-tainties and their correlations are taken into account vianuisance parameters in the fit. By normalizing the lim-its by the integrated luminosity of the data sample, theycan be interpreted as upper limits on the visible BSMcross section, σ vis , defined as the product of acceptance,1 E v en t s / G e V = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducibleZZ ZtttWZHiggsVVV
VR0Z [GeV] missT
E0 5 10 15 20 25 30 35 40 45 50 S M Σ D a t a / (a) VR0Z E v en t s / G e V -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducibleZZ ZtttWZHiggsVVV
VR0Z [GeV] eff m100 200 300 400 500 600 700 800 900 S M Σ D a t a / (b) VR0Z E v en t s / G e V = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducibleZZ ZtttWZHiggsVVV
VR2Z [GeV] missT
E0 5 10 15 20 25 30 35 40 45 50 S M Σ D a t a / (c) VR2Z E v en t s / G e V -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducibleZZ ZtttWZHiggsVVV
VR2Z [GeV] eff m0 100 200 300 400 500 600 S M Σ D a t a / (d) VR2Z FIG. 4. The (a),(c) E missT and (b),(d) m eff distributions for data and the estimated SM backgrounds, in validation regionsVR0Z and VR2Z. Both the statistical and systematic uncertainties are included in the shaded uncertainty band. Underneatheach plot, the ratio of the observed data to the SM prediction is shown, for comparison with the background uncertainty. reconstruction efficiency and production cross section.The results of both the asymptotic calculations [113] andpseudoexperiments for σ vis are given in Table X. In addi-tion, the probability ( p ) that a background-only exper-iment is more signal-like than the observation is quotedfor each region, as well as the significance of upward fluc-tuations. Where the observed number of data events islower than the background prediction, p is truncated at0.5 and no significance is quoted. No significant devia-tion is found from SM expectations in any of the signalregions, within statistical and systematic uncertainties.The model-independent limits on σ vis all lie below 0.5 fb.The E missT and m eff distributions in all signal regionsare shown in Figs. 5–7. For each signal region, a SUSYsignal model is superimposed on the SM background pre-diction, for illustration. RPC simplified models are cho-sen to illustrate SR0noZa and SR2noZa (R-slepton andstau models, respectively), for which these regions are de-signed. Similarly, the GGM model with tan β = 30 illus-trates the sensitivity of SR0Z to SUSY. A variety of RPVsimplified models with different experimental signatures are used to illustrate the sensitivity of the remaining sig-nal regions. Good agreement is again seen between SMbackground expectations and data, within uncertainties. XI. INTERPRETATIONS IN NEW PHYSICSSCENARIOS
The results of this analysis are interpreted in RPV sim-plified models, for various assumed λ ijk parameters, aswell as in the RPC simplified models and in RPC GGMmodels, all presented in Sec. II. As more than one sig-nal region may be sensitive to any particular scenario, astatistical combination of different signal regions is per-formed to extract the limits. Section VI defines threepairs of overlapping signal regions in which a Z -veto isapplied (SR0noZa/b, SR1noZa/b and SR2noZa/b). Foreach mass point in every model considered, the signalregion providing the best expected sensitivity for thatmodel is chosen from each pair. The three selected Z -vetosignal regions are combined with each other and with the2 [GeV] missT E50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(450,300) GeV χ∼ , χ∼ , m(l~ via χ∼ χ∼ SR0noZa (a) SR0noZa [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(450,300) GeV χ∼ , χ∼ , m(l~ via χ∼ χ∼ SR0noZa (b) SR0noZa [GeV] missT
E50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(225,100) GeV χ∼ , L l~0, m( ≠ λ , L- l~ L+ l~ SR1noZa (c) SR1noZa [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(225,100) GeV χ∼ , L l~0, m( ≠ λ , L- l~ L+ l~ SR1noZa (d) SR1noZa [GeV] missT
E50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(100,0) GeV χ∼ , χ∼ , m( τ∼ via χ∼ χ∼ SR2noZa (e) SR2noZa [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(100,0) GeV χ∼ , χ∼ , m( τ∼ via χ∼ χ∼ SR2noZa (f) SR2noZa
FIG. 5. The E missT and m eff distributions for data and the estimated SM backgrounds, in signal regions (a)–(b) SR0noZa,(c)–(d) SR1noZa, and (e)–(f) SR2noZa. The irreducible background is estimated from MC simulation while the reduciblebackground is estimated from data using the weighting method. Both the statistical and systematic uncertainties are includedin the shaded bands. In each panel the distribution for a relevant SUSY signal model is also shown, where the numbers inparentheses indicate ( m ˜ χ , , m ˜ χ ) for (a)–(b) and (e)–(f), or ( m NLSP , m LSP ) for (c)–(d), where all masses are in GeV. [GeV] missT E0 50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(600,400) GeV χ∼ , ± χ∼
0, m( ≠ λ , -1 χ∼ +1 χ∼ SR0noZb (a) SR0noZb [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(600,400) GeV χ∼ , ± χ∼
0, m( ≠ λ , -1 χ∼ +1 χ∼ SR0noZb (b) SR0noZb [GeV] missT
E0 50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(800,400) GeV χ∼ ,g~0, m( ≠ λ , g~g~ SR1noZb (c) SR1noZb [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(800,400) GeV χ∼ ,g~0, m( ≠ λ , g~g~ SR1noZb (d) SR1noZb [GeV] missT
E0 50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(225,100) GeV χ∼ , L l~0, m( ≠ λ , L- l~ L+ l~ SR2noZb (e) SR2noZb [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(225,100) GeV χ∼ , L l~0, m( ≠ λ , L- l~ L+ l~ SR2noZb (f) SR2noZb
FIG. 6. The E missT and m eff distributions for data and the estimated SM backgrounds, in signal regions (a)–(b) SR0noZb,(c)–(d) SR1noZb, and (e)–(f) SR2noZb. The irreducible background is estimated from MC simulation while the reduciblebackground is estimated from data using the weighting method. Both the statistical and systematic uncertainties are includedin the shaded bands. In each panel the distribution for a relevant SUSY signal model is also shown, where the numbers inparentheses indicate ( m NLSP , m LSP ) in GeV. [GeV] missT E50 100 150 200 250 300 E v en t s / G e V -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(200,1000) GeV g~ ,m µ =30, ( β GGM tan
SR0Z (a) SR0Z [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(200,1000) GeV g~ ,m µ =30, ( β GGM tan
SR0Z (b) SR0Z [GeV] missT
E100 150 200 250 300 350 400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(225,100) GeV χ∼ , L l~0, m( ≠ λ , L- l~ L+ l~ SR1Z (c) SR1Z [GeV] eff m0 200 400 600 800 1000 1200 1400 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(225,100) GeV χ∼ , L l~0, m( ≠ λ , L- l~ L+ l~ SR1Z (d) SR1Z [GeV] missT
E50 100 150 200 250 300 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(800,400) GeV χ∼ ,g~0, m( ≠ λ , g~g~ SR2Z (e) SR2Z [GeV] eff m0 200 400 600 800 1000 1200 E v en t s / G e V -2 -1 = 8 TeVs -1 L dt = 20.3 fb ∫ ATLAS
Data 2012 Total SMReducible ZZ Ztt tWZHiggs VVV)=(800,400) GeV χ∼ ,g~0, m( ≠ λ , g~g~ SR2Z (f) SR2Z
FIG. 7. The E missT and m eff distributions for data and the estimated SM backgrounds, in signal regions (a)–(b) SR0Z, (c)–(d) SR1Z and (e)–(f) SR2Z. The irreducible background is estimated from MC simulation while the reducible background isestimated from data using the weighting method. Both the statistical and systematic uncertainties are included in the shadedbands. In each panel the distribution for a relevant SUSY signal model is also shown, where the numbers in parentheses indicate( µ , m ˜ g ) for (a)–(b), or ( m NLSP , m LSP ) for (c)–(f), where all masses are in GeV. TABLE IX. The number of data events observed in each signal region, together with background predictions in the sameregions. Quoted uncertainties include both the statistical and systematic uncertainties, taking into account correlations. Wherea negative uncertainty reaches down to zero predicted events, it is truncated.
ZZ/Zγ ∗ tW Z t ¯ t + Z V V V
Higgs Reducible Σ SM DataSR0noZa 0 . ± .
08 0 . ± .
033 0 . ± . . ± .
09 0 . ± .
23 0 . +0 . − . . ± . . ± .
07 0 . ± .
028 0 . ± .
08 0 . ± .
07 0 . ± .
33 3 . +1 . − . . +1 . − . . ± .
04 0 . ± .
012 0 . ± .
10 0 . ± .
024 0 . ± .
16 3 . ± . . +1 . − . . ± .
05 0 . ± .
024 0 . ± .
34 0 . ± .
07 0 . ± .
20 0 . +0 . − . . ± . . +0 . − . . ± .
026 0 . ± .
07 0 . ± .
04 0 . ± .
26 2 . +1 . − . . +1 . − . . +0 . − . . ± .
009 0 . +0 . − . . ± .
018 0 . ± .
12 2 . +0 . − . . ± . . +0 . − . . ± .
13 2 . ± . . ± . . +0 . − . . +0 . − . . ± . . +0 . − . . ± .
022 0 . ± .
19 0 . ± .
11 0 . ± .
05 1 . ± . . ± . . +0 . − . . ± . . ± .
024 0 . ± .
014 0 . +0 . − . . ± . . ± . TABLE X. Observed and expected 95% CL upper limits on the number of signal events ( N obsBSM and N expBSM , respectively), andobserved and expected 95% CL upper limits on the visible cross section ( σ obsvis and σ expvis , respectively) for each of the signalregions. The probability ( p ) that a background-only experiment is more signal-like than the observation (truncated at 0.5)and, when p < .
5, the significance of the difference between the observed data and the expectation expressed as a number ofstandard deviations ( N σ ) are also given. The asymptotic calculation [marked “(asym.)”] of the results for σ vis is included forcomparison with the results using pseudoexperiments. The number of observed data events and expected background eventsin each region is also repeated from Table IX for completeness. Σ SM Data N obsBSM N expBSM σ obsvis [fb] (asym.) σ expvis [fb] (asym.) p N σ SR0noZa 1 . ± . . +1 . − . . +0 . − . (0 . +0 . − . ) 0.15 1.02SR1noZa 4 . +1 . − . . +2 . − . . +0 . − . (0 . +0 . − . ) 0.50 − SR2noZa 4 . +1 . − . . +2 . − . . +0 . − . (0 . +0 . − . ) 0.13 1.14SR0noZb 1 . ± . . ± . . ± .
07 (0 . +0 . − . ) 0.50 − SR1noZb 2 . +1 . − . . +1 . − . . +0 . − . (0 . +0 . − . ) 0.50 − SR2noZb 3 . ± . . +2 . − . . +0 . − . (0 . +0 . − . ) 0.10 1.30SR0Z 5 . ± . . +2 . − . . +0 . − . (0 . +0 . − . ) 0.29 0.55SR1Z 2 . ± . . +1 . − . . +0 . − . (0 . +0 . − . ) 0.34 0.40SR2Z 1 . ± . . +1 . − . . +0 . − . (0 . +0 . − . ) 0.50 − remaining three signal regions (SR0Z, SR1Z and SR2Z),taking into account possible correlations of systematicuncertainties between signal regions. Asymptotic formu-las for the test statistic distribution [113] are used whensetting model-dependent limits, and signal contamina-tion in the control regions is accounted for. A. RPV simplified models
The observed and expected 95% CL exclusion limitcontours for the RPV chargino NLSP and gluino NLSPsimplified models discussed in Sec. II are shown in Fig. 8.The colored band around the median expected limitshows the ± σ variations on the limit, including all un-certainties except the theoretical uncertainty on the sig-nal cross section. Different choices of λ ijk parameterscorrespond to differently colored bands, as per labels inthe legend. The dotted lines indicate changes in the cor-responding observed limit due to ± σ variations of thesignal cross section by the theoretical uncertainty. Theconservative − σ variation is used to quote limits. Simi- lar conventions are adopted for all exclusion contours andcorresponding limits. Figure 9 shows the observed andexpected 95% CL limit contours for the RPV L-sleptonNLSP, R-slepton NLSP and sneutrino NLSP simplifiedmodels.In all cases, the observed limit is determined primar-ily by the production cross section of the signal process,with stronger constraints on models where λ or λ dominate, and less stringent limits for tau-rich decays via λ or λ . Limits on models with different combina-tions of λ ijk parameters can generically be expected tolie between these extremes. The limits are in many casesnearly insensitive to the ˜ χ mass, except where the ˜ χ is significantly less massive than the NLSP. When this isthe case [for example, m ˜ χ < ∼
50 GeV in Fig. 9(a)], the ˜ χ produced in the NLSP decay has substantial momentumin the laboratory frame of reference, and its decay prod-ucts either tend to travel close to the ˜ χ direction, becom-ing collimated, or one of the leptons becomes soft. Theseeffects reduce the analysis acceptance and efficiency, es-pecially if the LSP decays to one or more hadronically6 (a) Chargino NLSP(b) Gluino NLSP FIG. 8. The observed (solid) and expected (dashed) 95%CL exclusion limit contours for the RPV (a) chargino NLSPand (b) gluino NLSP simplified models, assuming a promptlydecaying LSP. The exclusion limits include all uncertaintiesexcept the theoretical cross section uncertainty for the sig-nal, the effect of which is indicated by the dotted lines eitherside of the observed exclusion limit contours. The shadedbands around each expected exclusion limit curve show the ± σ results. No events above the diagonal dashed line weregenerated. decaying taus. Where the NLSP → LSP cascade may alsoproduce leptons (specifically, the chargino and sleptonmodels), the observed limit may also become weaker as m ˜ χ approaches the NLSP mass, and the cascade prod-uct momenta fall below threshold.When the mass of the ˜ χ LSP is at least as large as20% of the NLSP mass, and assuming tau-rich LSP de-cays, lower limits can be placed on sparticle masses, ex-cluding gluinos with masses less than 950 GeV; wino-like charginos with masses less than 450 GeV; and L(R)-sleptons with masses less than 300 (240) GeV. If in-stead the LSP decays only to electrons and muons, the equivalent limits are approximately 1350 GeV for gluinos,750 GeV for charginos, 490 (410) GeV for L(R)-sleptons,and a lower limit of 400 GeV can also be placed on sneu-trino masses. These results significantly improve uponprevious searches at the LHC, where gluino masses of upto 1 TeV [28] and chargino masses of up to 540 GeV [26]were excluded.
B. RPC simplified models
The observed and expected 95% CL limit contours forthe R-slepton RPC simplified models considered in thispaper are shown in Fig. 10(a), while Figs. 10(b) and 10(c)present the observed and expected 95% CL limits on theproduction cross section for the stau and Z RPC sim-plified models, respectively, assuming zero mass for the˜ χ .The strongest constraints for RPC models are obtainedin the R-slepton model. In this case, ˜ χ , with masses ofup to 620 GeV are excluded if the LSP is massless. As theLSP mass increases, the leptons from the cascade becomeless energetic, decreasing the analysis acceptance. Themaximum ˜ χ mass that can be excluded by this analysisis 340 GeV. In the region allowed by the LEP ( m ˜ χ , ˜ χ > ∼
100 GeV [114–117]), no limits are set on the stau or Z models. C. RPC GGM models
The observed and expected 95% CL limit contours forthe two GGM models considered in this paper are shownin Fig. 11. Only regions with a Z boson requirement arestatistically combined to extract these limits.Independently of the value of µ , gluinos with m ˜ g <
700 GeV are excluded for tan β = 1 .
5. For very largegluino masses, the direct production of ˜ χ , ˜ χ ± and ˜ χ be-comes dominant, and values of µ between 200 and about230 GeV are excluded for any gluino mass. For the largervalue of tan β = 30, the limits are weaker: gluinos withmasses less than about 640 GeV are excluded at 95% CL. XII. SUMMARY
A search has been performed for SUSY signals infinal states with four or more leptons using the AT-LAS detector, based on a data sample correspondingto 20.3 fb − of proton-proton collisions delivered by theLHC at √ s = 8 TeV in 2012. The analysis targets lepton-rich RPV and RPC SUSY signals, including those fromGGM SUSY, which can be either enriched in or depletedof Z -boson production. No significant deviation is ob-served from SM expectations, within statistical and sys-tematic uncertainties. The null result is interpreted by7providing 95% CL upper limits on the visible cross sec-tion of new processes within each signal region, which liebetween 0.17 and 0.45 fb, depending on the final state.Limits are also placed on sparticle masses in specificSUSY models. In RPV models where the LSP de-cays only to electrons and muons, the 95% CL lowermass limits are the following: 1350 GeV for the gluino,750 GeV for winolike charginos and 490 (410) GeV forL(R)-sleptons. Slightly less stringent limits are placedon the same parameters for RPV models with tau-richdecays. In both cases the mass of the LSP is assumed tobe at least as large as 20% of the NLSP mass. A limitof 400 GeV can be placed on sneutrino masses for RPVmodels with electron and muon decays of the LSP.The strongest constraints for RPC models are obtainedin the R-slepton model, where ˜ χ , with masses of up to620 GeV are excluded if the LSP is massless.For the GGM model with tan β = 1 .
5, values of µ be-tween 200 and about 230 GeV are excluded for any gluinomass, and gluinos with m ˜ g <
700 GeV are excluded inde-pendently of the value of µ . For tan β = 30, gluinos withmasses less than about 640 GeV are excluded at 95% CL. (a) L-slepton NLSP(b) R-slepton NLSP(c) Sneutrino NLSP FIG. 9. The 95% CL exclusion limit contours for the RPV(a) L-slepton NLSP, (b) R-slepton NLSP and (c) sneutrinoNLSP simplified models, assuming a promptly decaying LSP.For further details see Fig. 8. ) [GeV] χ∼ m(
100 200 300 400 500 600 700 ) [ G e V ] χ∼ m ( ) χ∼ ) < m ( , χ∼ m ( ) χ∼ ) = m( χ∼ m( χ∼ - l + l → ± l ± R l~ → χ∼ ATLAS =8 TeVs, -1 L dt = 20.3 fb ∫ =8 TeVs, -1 L dt = 20.3 fb ∫ ) theory σ ± Observed limit ( ) σ ± Expected limit (
All limits at 95% CL (a) R-slepton RPC ) [GeV] χ∼ m(
100 150 200 250 300 350 [ pb ] S U SY σ % C L uppe r li m i t on -2 -1 ATLAS = 8 TeVs, -1 L dt = 20.3 fb ∫ χ∼ - τ + τ → ± τ∼ ± τ → χ∼ ) = 0. χ∼ m( ) σ ± Expected limit (Observed limit ) theory σ ± ( χ∼ χ∼ → pp (b) Stau RPC ) [GeV] χ∼ m(
100 150 200 250 300 350 400 [ pb ] S U SY σ % C L uppe r li m i t on -2 -1 ATLAS = 8 TeVs, -1 L dt = 20.3 fb ∫ χ∼ Z → χ∼ ) = 0. χ∼ m( ) σ ± Expected limit (Observed limit ) theory σ ± ( χ∼ χ∼ → pp (c) Z RPC
FIG. 10. The 95% CL exclusion limits for the RPC models:(a) R-slepton mass exclusion limit; (b) stau model and (c) Z model upper limits on the production cross section for amassless LSP. For further details see Fig. 8. [GeV] µ
200 300 400 500 600 700 800 900 [ G e V ] g ~ m µ < g ~ m = 1.5 β GGM tan
300 400 500 600 700 ) [GeV] χ∼ m( ATLAS =8 TeVs, -1 L dt = 20.3 fb ∫ ) theory σ ± Observed limit ( ) σ ± Expected limit (
All limits at 95% CL (a) GGM tan β =1.5 [GeV] µ
200 300 400 500 600 700 800 900 [ G e V ] g ~ m µ < g ~ m = 30 β GGM tan
300 400 500 600 700 ) [GeV] χ∼ m( ATLAS =8 TeVs, -1 L dt = 20.3 fb ∫ ) theory σ ± Observed limit ( ) σ ± Expected limit (
All limits at 95% CL (b) GGM tan β =30 FIG. 11. The 95% CL exclusion limit contours for the (a)tan β = 1 . β = 30 GGM models. The lowershaded area shows the excluded region. For further detailssee Fig. 8. ACKNOWLEDGMENTS
We thank CERN for the very successful operation ofthe LHC, as well as the support staff from our institutionswithout whom ATLAS could not be operated efficiently.We acknowledge the support of ANPCyT, Argentina;YerPhI, Armenia; ARC, Australia; BMWF and FWF,Austria; ANAS, Azerbaijan; SSTC, Belarus; CNPqand FAPESP, Brazil; NSERC, NRC and CFI, Canada;CERN; CONICYT, Chile; CAS, MOST and NSFC,China; COLCIENCIAS, Colombia; MSMT CR, MPOCR and VSC CR, Czech Republic; DNRF, DNSRCand Lundbeck Foundation, Denmark; EPLANET, ERCand NSRF, European Union; IN2P3-CNRS, CEA-DSM/IRFU, France; GNSF, Georgia; BMBF, DFG,HGF, MPG and AvH Foundation, Germany; GSRTand NSRF, Greece; ISF, MINERVA, GIF, I-CORE andBenoziyo Center, Israel; INFN, Italy; MEXT and JSPS, Japan; CNRST, Morocco; FOM and NWO, Netherlands;BRF and RCN, Norway; MNiSW and NCN, Poland;GRICES and FCT, Portugal; MNE/IFA, Romania; MESof Russia and ROSATOM, Russian Federation; JINR;MSTD, Serbia; MSSR, Slovakia; ARRS and MIZˇS, Slove-nia; DST/NRF, South Africa; MINECO, Spain; SRCand Wallenberg Foundation, Sweden; SER, SNSF andCantons of Bern and Geneva, Switzerland; NSC, Tai-wan; TAEK, Turkey; STFC, the Royal Society and Lev-erhulme Trust, United Kingdom; DOE and NSF, UnitedStates of America.The crucial computing support from all WLCG part-ners is acknowledged gratefully, in particular fromCERN and the ATLAS Tier-1 facilities at TRIUMF(Canada), NDGF (Denmark, Norway, Sweden), CC-IN2P3 (France), KIT/GridKA (Germany), INFN-CNAF(Italy), NL-T1 (Netherlands), PIC (Spain), ASGC (Tai-wan), RAL (UK) and BNL (USA) and in the Tier-2 fa-cilities [1] H. Miyazawa, Prog. Theor. Phys.
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G. Aad , B. Abbott , J. Abdallah , S. Abdel Khalek , O. Abdinov , R. Aben , B. Abi , M. Abolins ,O.S. AbouZeid , H. Abramowicz , H. Abreu , R. Abreu , Y. Abulaiti , , B.S. Acharya , ,a ,L. Adamczyk , D.L. Adams , J. Adelman , S. Adomeit , T. Adye , T. Agatonovic-Jovin ,J.A. Aguilar-Saavedra , , M. Agustoni , S.P. Ahlen , F. Ahmadov ,b , G. Aielli , ,H. Akerstedt , , T.P.A. ˚Akesson , G. Akimoto , A.V. Akimov , G.L. Alberghi , , J. Albert ,S. Albrand , M.J. Alconada Verzini , M. Aleksa , I.N. Aleksandrov , C. Alexa , G. Alexander ,G. Alexandre , T. Alexopoulos , M. Alhroob , , G. Alimonti , L. Alio , J. Alison , B.M.M. Allbrooke ,L.J. Allison , P.P. Allport , J. Almond , A. Aloisio , , A. Alonso , F. Alonso , C. Alpigiani ,A. Altheimer , B. Alvarez Gonzalez , M.G. Alviggi , , K. Amako , Y. Amaral Coutinho , C. Amelung ,D. Amidei , S.P. Amor Dos Santos , , A. Amorim , , S. Amoroso , N. Amram , G. Amundsen ,C. Anastopoulos , L.S. Ancu , N. Andari , T. Andeen , C.F. Anders , G. 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Baranov , E.L. Barberio , D. Barberis , , M. Barbero , T. Barillari ,M. Barisonzi , T. Barklow , N. Barlow , B.M. Barnett , R.M. Barnett , Z. Barnovska , A. Baroncelli ,G. Barone , A.J. Barr , F. Barreiro , J. Barreiro Guimar˜aes da Costa , R. Bartoldus , A.E. Barton ,P. Bartos , V. Bartsch , A. Bassalat , A. Basye , R.L. Bates , L. Batkova , J.R. Batley ,M. Battistin , F. Bauer , H.S. Bawa ,e , T. Beau , P.H. Beauchemin , R. Beccherle , , P. Bechtle ,H.P. Beck , K. Becker , S. Becker , M. Beckingham , C. Becot , A.J. Beddall , A. Beddall ,S. Bedikian , V.A. Bednyakov , C.P. Bee , L.J. Beemster , T.A. Beermann , M. Begel , K. Behr ,C. Belanger-Champagne , P.J. Bell , W.H. Bell , G. Bella , L. Bellagamba , A. Bellerive , M. Bellomo ,A. Belloni , K. Belotskiy , O. Beltramello , O. Benary , D. Benchekroun , K. Bendtz , , N. Benekos ,Y. Benhammou , E. Benhar Noccioli , J.A. Benitez Garcia , D.P. Benjamin , J.R. Bensinger ,K. Benslama , S. Bentvelsen , D. Berge , E. Bergeaas Kuutmann , N. 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Boscherini , M. Bosman , H. Boterenbrood , J. Boudreau , J. Bouffard , E.V. Bouhova-Thacker ,D. Boumediene , C. Bourdarios , N. Bousson , S. Boutouil , A. Boveia , J. Boyd , I.R. Boyko ,I. Bozovic-Jelisavcic , J. Bracinik , P. Branchini , A. Brandt , G. Brandt , O. Brandt , U. Bratzler ,B. Brau , J.E. Brau , H.M. Braun , ∗ , S.F. Brazzale , , B. Brelier , K. Brendlinger , A.J. Brennan ,R. Brenner , S. Bressler , K. Bristow , T.M. Bristow , D. Britton , F.M. Brochu , I. Brock , R. Brock ,C. Bromberg , J. Bronner , G. Brooijmans , T. Brooks , W.K. Brooks , J. Brosamer , E. Brost ,G. Brown , J. Brown , P.A. Bruckman de Renstrom , D. Bruncko , R. Bruneliere , S. Brunet , A. Bruni ,G. Bruni , M. Bruschi , L. Bryngemark , T. Buanes , Q. Buat , F. Bucci , P. Buchholz ,R.M. Buckingham , A.G. Buckley , S.I. Buda , I.A. Budagov , F. Buehrer , L. Bugge , M.K. Bugge ,O. Bulekov , A.C. Bundock , H. Burckhart , S. Burdin , B. Burghgrave , S. Burke , I. Burmeister ,E. Busato , D. B¨uscher , V. B¨uscher , P. Bussey , C.P. Buszello , B. Butler , J.M. Butler , A.I. Butt ,C.M. Buttar , J.M. Butterworth , P. Butti , W. Buttinger , A. Buzatu , M. Byszewski ,S. Cabrera Urb´an , D. Caforio , , O. Cakir , P. Calafiura , A. Calandri , G. Calderini , P. Calfayan ,R. Calkins , L.P. Caloba , D. Calvet , S. Calvet , R. Camacho Toro , S. Camarda , D. Cameron ,3L.M. Caminada , R. Caminal Armadans , S. Campana , M. Campanelli , A. Campoverde , V. Canale , ,A. Canepa , M. Cano Bret , J. Cantero , R. Cantrill , T. Cao , M.D.M. Capeans Garrido , I. Caprini ,M. Caprini , M. Capua , , R. Caputo , R. Cardarelli , T. Carli , G. Carlino , L. Carminati , ,S. Caron , E. Carquin , G.D. Carrillo-Montoya , J.R. Carter , J. Carvalho , , D. Casadei ,M.P. Casado , M. Casolino , E. Castaneda-Miranda , A. Castelli , V. Castillo Gimenez , N.F. Castro ,P. Catastini , A. Catinaccio , J.R. Catmore , A. Cattai , G. Cattani , , S. Caughron , V. Cavaliere ,D. Cavalli , M. Cavalli-Sforza , V. Cavasinni , , F. 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Dai , O. Dale , F. Dallaire , C. Dallapiccola , M. Dam , A.C. Daniells ,M. Dano Hoffmann , V. Dao , G. Darbo , G.L. Darlea , S. Darmora , J.A. Dassoulas , A. Dattagupta ,W. Davey , C. David , T. Davidek , E. Davies ,c , M. Davies , O. Davignon , A.R. Davison ,P. Davison , Y. Davygora , E. Dawe , I. Dawson , R.K. Daya-Ishmukhametova , K. De ,R. de Asmundis , S. De Castro , , S. De Cecco , N. De Groot , P. de Jong , H. De la Torre ,F. De Lorenzi , L. De Nooij , D. De Pedis , A. De Salvo , U. De Sanctis , , A. De Santo ,J.B. De Vivie De Regie , G. De Zorzi , , W.J. Dearnaley , R. Debbe , C. Debenedetti , B. Dechenaux ,D.V. Dedovich , J. Degenhardt , I. Deigaard , J. Del Peso , T. Del Prete , , F. Deliot ,C.M. Delitzsch , M. Deliyergiyev , A. Dell’Acqua , L. Dell’Asta , M. Dell’Orso , , M. Della Pietra ,g ,D. della Volpe , M. Delmastro , P.A. Delsart , C. Deluca , S. Demers , M. Demichev , A. Demilly ,S.P. Denisov , D. Derendarz , J.E. Derkaoui , F. Derue , P. Dervan , K. Desch , C. Deterre ,P.O. Deviveiros , A. Dewhurst , S. Dhaliwal , A. Di Ciaccio , , L. Di Ciaccio , A. Di Domenico , ,C. Di Donato , , A. Di Girolamo , B. Di Girolamo , A. Di Mattia , B. Di Micco , , R. Di Nardo ,A. Di Simone , R. Di Sipio , , D. Di Valentino , M.A. Diaz , E.B. Diehl , J. Dietrich , T.A. Dietzsch ,S. Diglio , A. Dimitrievska , J. Dingfelder , C. Dionisi , , P. Dita , S. Dita , F. Dittus , F. Djama ,T. Djobava , M.A.B. do Vale , A. Do Valle Wemans , , T.K.O. Doan , D. Dobos , C. Doglioni ,T. Doherty , T. Dohmae , J. Dolejsi , Z. Dolezal , B.A. Dolgoshein , ∗ , M. Donadelli , S. Donati , ,P. Dondero , , J. Donini , J. Dopke , A. Doria , M.T. Dova , A.T. Doyle , M. Dris , J. Dubbert ,S. Dube , E. Dubreuil , E. Duchovni , G. Duckeck , O.A. Ducu , D. Duda , A. Dudarev , F. Dudziak ,L. Duflot , L. Duguid , M. D¨uhrssen , M. Dunford , H. Duran Yildiz , M. D¨uren , A. Durglishvili ,M. Dwuznik , M. Dyndal , J. Ebke , W. Edson , N.C. Edwards , W. Ehrenfeld , T. Eifert , G. Eigen ,K. Einsweiler , T. Ekelof , M. El Kacimi , M. Ellert , S. Elles , F. Ellinghaus , N. Ellis , J. Elmsheuser ,M. Elsing , D. Emeliyanov , Y. Enari , O.C. Endner , M. Endo , R. Engelmann , J. Erdmann ,A. Ereditato , D. Eriksson , G. Ernis , J. Ernst , M. Ernst , J. Ernwein , D. Errede , S. Errede ,E. Ertel , M. Escalier , H. Esch , C. Escobar , B. Esposito , A.I. Etienvre , E. Etzion , H. Evans ,L. Fabbri , , G. Facini , R.M. Fakhrutdinov , S. Falciano , R.J. Falla , J. Faltova , Y. Fang ,M. Fanti , , A. Farbin , A. Farilla , T. Farooque , S. Farrell , S.M. Farrington , P. Farthouat ,F. Fassi , P. Fassnacht , D. Fassouliotis , A. Favareto , , L. Fayard , P. Federic , O.L. Fedin ,i ,W. Fedorko , M. Fehling-Kaschek , S. Feigl , L. Feligioni , C. Feng , E.J. Feng , H. Feng , A.B. Fenyuk ,S. Fernandez Perez , S. Ferrag , J. Ferrando , A. Ferrari , P. Ferrari , R. Ferrari , D.E. Ferreira de Lima ,A. Ferrer , D. Ferrere , C. Ferretti , A. Ferretto Parodi , , M. Fiascaris , F. Fiedler , A. Filipˇciˇc ,4M. Filipuzzi , F. Filthaut , M. Fincke-Keeler , K.D. Finelli , M.C.N. Fiolhais , , L. Fiorini ,A. Firan , J. Fischer , W.C. Fisher , E.A. Fitzgerald , M. Flechl , I. Fleck , P. Fleischmann ,S. Fleischmann , G.T. Fletcher , G. Fletcher , T. Flick , A. Floderus , L.R. Flores Castillo ,j ,A.C. Florez Bustos , M.J. Flowerdew , A. Formica , A. Forti , D. Fortin , D. Fournier , H. Fox ,S. Fracchia , P. Francavilla , M. Franchini , , S. Franchino , D. Francis , M. Franklin , S. Franz ,M. Fraternali , , S.T. French , C. Friedrich , F. Friedrich , D. Froidevaux , J.A. Frost , C. Fukunaga ,E. Fullana Torregrosa , B.G. Fulsom , J. Fuster , C. Gabaldon , O. Gabizon , A. Gabrielli , ,A. Gabrielli , , S. Gadatsch , S. Gadomski , G. Gagliardi , , P. Gagnon , C. Galea ,B. Galhardo , , E.J. Gallas , V. Gallo , B.J. Gallop , P. Gallus , G. Galster , K.K. Gan ,R.P. Gandrajula , J. Gao ,f , Y.S. Gao ,e , F.M. Garay Walls , F. Garberson , C. Garc´ıa ,J.E. Garc´ıa Navarro , M. Garcia-Sciveres , R.W. Gardner , N. Garelli , V. Garonne , C. Gatti ,G. Gaudio , B. Gaur , L. Gauthier , P. Gauzzi , , I.L. Gavrilenko , C. Gay , G. Gaycken ,E.N. Gazis , P. Ge , Z. Gecse , C.N.P. Gee , D.A.A. Geerts , Ch. Geich-Gimbel , K. Gellerstedt , ,C. Gemme , A. Gemmell , M.H. Genest , S. Gentile , , M. George , S. George , D. Gerbaudo ,A. Gershon , H. Ghazlane , N. Ghodbane , B. Giacobbe , S. Giagu , , V. Giangiobbe ,P. Giannetti , , F. Gianotti , B. Gibbard , S.M. Gibson , M. Gilchriese , T.P.S. Gillam , D. Gillberg ,G. Gilles , D.M. Gingrich ,d , N. Giokaris , M.P. Giordani , , R. Giordano , , F.M. Giorgi ,F.M. Giorgi , P.F. Giraud , D. Giugni , C. Giuliani , M. Giulini , B.K. Gjelsten , I. Gkialas ,k ,L.K. Gladilin , C. Glasman , J. Glatzer , P.C.F. Glaysher , A. Glazov , G.L. Glonti , M. Goblirsch-Kolb ,J.R. Goddard , J. Godfrey , J. Godlewski , C. Goeringer , S. Goldfarb , T. Golling , D. Golubkov ,A. Gomes , , , L.S. Gomez Fajardo , R. Gon¸calo , J. Goncalves Pinto Firmino Da Costa ,L. Gonella , S. Gonz´alez de la Hoz , G. Gonzalez Parra , M.L. Gonzalez Silva , S. Gonzalez-Sevilla ,L. Goossens , P.A. Gorbounov , H.A. Gordon , I. Gorelov , B. Gorini , E. Gorini , , A. Goriˇsek ,E. Gornicki , A.T. Goshaw , C. G¨ossling , M.I. Gostkin , M. Gouighri , D. Goujdami , M.P. Goulette ,A.G. Goussiou , C. Goy , S. Gozpinar , H.M.X. Grabas , L. Graber , I. Grabowska-Bold ,P. Grafstr¨om , , K-J. Grahn , J. Gramling , E. Gramstad , S. Grancagnolo , V. Grassi , V. Gratchev ,H.M. Gray , E. Graziani , O.G. Grebenyuk , Z.D. Greenwood ,l , K. Gregersen , I.M. Gregor ,P. Grenier , J. Griffiths , A.A. Grillo , K. Grimm , S. Grinstein ,m , Ph. Gris , Y.V. Grishkevich ,J.-F. Grivaz , J.P. Grohs , A. Grohsjean , E. Gross , J. Grosse-Knetter , G.C. Grossi , ,J. Groth-Jensen , Z.J. Grout , K. Grybel , L. Guan , F. Guescini , D. Guest , O. Gueta ,C. Guicheney , E. Guido , , T. Guillemin , S. Guindon , U. Gul , C. Gumpert , J. Gunther , J. Guo ,S. Gupta , P. Gutierrez , N.G. Gutierrez Ortiz , C. Gutschow , N. Guttman , C. Guyot , C. Gwenlan ,C.B. Gwilliam , A. Haas , C. Haber , H.K. Hadavand , N. Haddad , P. Haefner , S. Hageb¨ock ,Z. Hajduk , H. Hakobyan , M. Haleem , D. Hall , G. Halladjian , K. Hamacher , P. Hamal ,K. Hamano , M. Hamer , A. Hamilton , S. Hamilton , P.G. Hamnett , L. Han , K. Hanagaki ,K. Hanawa , M. Hance , P. Hanke , R. Hanna , J.B. Hansen , J.D. Hansen , P.H. Hansen , K. Hara ,A.S. Hard , T. Harenberg , F. Hariri , S. Harkusha , D. Harper , R.D. Harrington , O.M. Harris ,P.F. Harrison , F. Hartjes , S. Hasegawa , Y. Hasegawa , A. Hasib , S. Hassani , S. Haug ,M. Hauschild , R. Hauser , M. Havranek , C.M. Hawkes , R.J. Hawkings , A.D. Hawkins , T. Hayashi ,D. Hayden , C.P. Hays , H.S. Hayward , S.J. Haywood , S.J. Head , T. Heck , V. Hedberg , L. Heelan ,S. Heim , T. Heim , B. Heinemann , L. Heinrich , S. Heisterkamp , J. Hejbal , L. Helary , C. Heller ,M. Heller , S. Hellman , , D. Hellmich , C. Helsens , J. Henderson , R.C.W. Henderson , C. Hengler ,A. Henrichs , A.M. Henriques Correia , S. Henrot-Versille , C. Hensel , G.H. Herbert ,Y. Hern´andez Jim´enez , R. Herrberg-Schubert , G. Herten , R. Hertenberger , L. Hervas , G.G. Hesketh ,N.P. Hessey , R. Hickling , E. Hig´on-Rodriguez , E. Hill , J.C. Hill , K.H. Hiller , S. Hillert , S.J. Hillier ,I. Hinchliffe , E. Hines , M. Hirose , D. Hirschbuehl , J. Hobbs , N. Hod , M.C. Hodgkinson ,P. Hodgson , A. Hoecker , M.R. Hoeferkamp , J. Hoffman , D. Hoffmann , J.I. Hofmann , M. Hohlfeld ,T.R. Holmes , T.M. Hong , L. Hooft van Huysduynen , J-Y. Hostachy , S. Hou , A. Hoummada ,J. Howard , J. Howarth , M. Hrabovsky , I. Hristova , J. Hrivnac , T. Hryn’ova , P.J. Hsu , S.-C. Hsu ,D. Hu , X. Hu , Y. Huang , Z. Hubacek , F. Hubaut , F. Huegging , T.B. Huffman , E.W. Hughes ,G. Hughes , M. Huhtinen , T.A. H¨ulsing , M. Hurwitz , N. Huseynov ,b , J. Huston , J. Huth ,G. Iacobucci , G. Iakovidis , I. Ibragimov , L. Iconomidou-Fayard , E. Ideal , P. Iengo , O. Igonkina ,T. Iizawa , Y. Ikegami , K. Ikematsu , M. Ikeno , D. Iliadis , N. Ilic , Y. Inamaru , T. Ince ,P. Ioannou , M. Iodice , K. Iordanidou , V. Ippolito , A. Irles Quiles , C. Isaksson , M. Ishino ,M. Ishitsuka , R. Ishmukhametov , C. Issever , S. Istin , J.M. Iturbe Ponce , J. Ivarsson , A.V. Ivashin ,W. Iwanski , H. Iwasaki , J.M. Izen , V. Izzo , B. Jackson , M. Jackson , P. Jackson , M.R. Jaekel ,V. Jain , K. Jakobs , S. Jakobsen , T. Jakoubek , J. Jakubek , D.O. Jamin , D.K. Jana , E. Jansen ,H. Jansen , J. Janssen , M. Janus , G. Jarlskog , N. Javadov ,b , T. Jav˚urek , L. Jeanty , G.-Y. Jeng ,5D. Jennens , P. Jenni ,n , J. Jentzsch , C. Jeske , S. J´ez´equel , H. Ji , W. Ji , J. Jia , Y. Jiang ,M. Jimenez Belenguer , S. Jin , A. Jinaru , O. Jinnouchi , M.D. Joergensen , K.E. Johansson ,P. Johansson , K.A. Johns , K. Jon-And , , G. Jones , R.W.L. Jones , T.J. Jones , J. Jongmanns ,P.M. Jorge , , K.D. Joshi , J. Jovicevic , X. Ju , C.A. Jung , R.M. Jungst , P. Jussel ,A. Juste Rozas ,m , M. Kaci , A. Kaczmarska , M. Kado , H. Kagan , M. Kagan , E. Kajomovitz ,C.W. Kalderon , S. Kama , N. Kanaya , M. Kaneda , S. Kaneti , T. Kanno , V.A. Kantserov ,J. Kanzaki , B. Kaplan , A. Kapliy , D. Kar , K. Karakostas , N. Karastathis , M. Karnevskiy ,S.N. Karpov , K. Karthik , V. Kartvelishvili , A.N. Karyukhin , L. Kashif , G. Kasieczka , R.D. Kass ,A. Kastanas , Y. Kataoka , A. Katre , J. Katzy , V. Kaushik , K. Kawagoe , T. Kawamoto ,G. Kawamura , S. Kazama , V.F. Kazanin , M.Y. Kazarinov , R. Keeler , R. Kehoe , M. Keil ,J.S. Keller , J.J. Kempster , H. Keoshkerian , O. Kepka , B.P. Kerˇsevan , S. Kersten , K. Kessoku ,J. Keung , F. Khalil-zada , H. Khandanyan , , A. Khanov , A. Khodinov , A. Khomich , T.J. Khoo ,G. Khoriauli , A. Khoroshilov , V. Khovanskiy , E. Khramov , J. Khubua , H.Y. Kim , H. Kim , ,S.H. Kim , N. Kimura , O. Kind , B.T. King , M. King , R.S.B. King , S.B. King , J. Kirk ,A.E. Kiryunin , T. Kishimoto , D. Kisielewska , F. Kiss , T. Kitamura , T. Kittelmann , K. Kiuchi ,E. Kladiva , M. Klein , U. Klein , K. Kleinknecht , P. Klimek , , A. Klimentov , R. Klingenberg ,J.A. Klinger , T. Klioutchnikova , P.F. Klok , E.-E. Kluge , P. Kluit , S. Kluth , E. Kneringer ,E.B.F.G. Knoops , A. Knue , T. Kobayashi , M. Kobel , M. Kocian , P. Kodys , P. Koevesarki ,T. Koffas , E. Koffeman , L.A. Kogan , S. Kohlmann , Z. Kohout , T. Kohriki , T. Koi ,H. Kolanoski , I. Koletsou , J. Koll , A.A. Komar , ∗ , Y. Komori , T. Kondo , N. Kondrashova ,K. K¨oneke , A.C. K¨onig , S. K¨onig , T. Kono ,o , R. Konoplich ,p , N. Konstantinidis , R. Kopeliansky ,S. Koperny , L. K¨opke , A.K. Kopp , K. Korcyl , K. Kordas , A. Korn , A.A. Korol ,q , I. Korolkov ,E.V. Korolkova , V.A. Korotkov , O. Kortner , S. Kortner , V.V. Kostyukhin , V.M. Kotov , A. Kotwal ,C. Kourkoumelis , V. Kouskoura , A. Koutsman , R. Kowalewski , T.Z. Kowalski , W. Kozanecki ,A.S. Kozhin , V. Kral , V.A. Kramarenko , G. Kramberger , D. Krasnopevtsev , M.W. Krasny ,A. Krasznahorkay , J.K. Kraus , A. Kravchenko , S. Kreiss , M. Kretz , J. Kretzschmar , K. Kreutzfeldt ,P. Krieger , K. Kroeninger , H. Kroha , J. Kroll , J. Kroseberg , J. Krstic , U. Kruchonak , H. Kr¨uger ,T. Kruker , N. Krumnack , Z.V. Krumshteyn , A. Kruse , M.C. Kruse , M. Kruskal , T. Kubota ,S. Kuday , S. Kuehn , A. Kugel , A. Kuhl , T. Kuhl , V. Kukhtin , Y. Kulchitsky , S. Kuleshov ,M. Kuna , , J. Kunkle , A. Kupco , H. Kurashige , Y.A. Kurochkin , R. Kurumida , V. Kus ,E.S. Kuwertz , M. Kuze , J. Kvita , A. La Rosa , L. La Rotonda , , C. Lacasta , F. Lacava , ,J. Lacey , H. Lacker , D. Lacour , V.R. Lacuesta , E. Ladygin , R. Lafaye , B. Laforge , T. Lagouri ,S. Lai , H. Laier , L. Lambourne , S. Lammers , C.L. Lampen , W. Lampl , E. Lan¸con , U. Landgraf ,M.P.J. Landon , V.S. Lang , C. Lange , A.J. Lankford , F. Lanni , K. Lantzsch , S. Laplace , C. Lapoire ,J.F. Laporte , T. Lari , M. Lassnig , P. Laurelli , W. Lavrijsen , A.T. Law , P. Laycock , B.T. Le ,O. Le Dortz , E. Le Guirriec , E. Le Menedeu , T. LeCompte , F. Ledroit-Guillon , C.A. Lee , H. Lee ,J.S.H. Lee , S.C. Lee , L. Lee , G. Lefebvre , M. Lefebvre , F. Legger , C. Leggett , A. Lehan ,M. Lehmacher , G. Lehmann Miotto , X. Lei , W.A. Leight , A. Leisos , A.G. Leister , M.A.L. Leite ,R. Leitner , D. Lellouch , B. Lemmer , K.J.C. Leney , T. Lenz , G. Lenzen , B. Lenzi , R. Leone ,K. Leonhardt , S. Leontsinis , C. Leroy , C.G. Lester , C.M. Lester , M. Levchenko , J. Levˆeque ,D. Levin , L.J. Levinson , M. Levy , A. Lewis , G.H. Lewis , A.M. Leyko , M. Leyton , B. Li ,r ,B. Li , H. Li , H.L. Li , L. Li , L. Li , S. Li , Y. Li ,s , Z. Liang , H. Liao , B. Liberti , P. Lichard ,K. Lie , J. Liebal , W. Liebig , C. Limbach , A. Limosani , S.C. Lin ,t , F. Linde , B.E. Lindquist ,J.T. Linnemann , E. Lipeles , A. Lipniacka , M. Lisovyi , T.M. Liss , D. Lissauer , A. Lister ,A.M. Litke , B. Liu , D. Liu , J.B. Liu , K. Liu ,u , L. Liu , M. Liu , M. Liu , Y. Liu ,M. Livan , , S.S.A. Livermore , A. Lleres , J. Llorente Merino , S.L. Lloyd , F. Lo Sterzo ,E. Lobodzinska , P. Loch , W.S. Lockman , T. Loddenkoetter , F.K. Loebinger , A.E. Loevschall-Jensen ,A. Loginov , C.W. Loh , T. Lohse , K. Lohwasser , M. Lokajicek , V.P. Lombardo , B.A. Long ,J.D. Long , R.E. Long , L. Lopes , D. Lopez Mateos , B. Lopez Paredes , I. Lopez Paz , J. Lorenz ,N. Lorenzo Martinez , M. Losada , P. Loscutoff , X. Lou , A. Lounis , J. Love , P.A. Love , A.J. Lowe ,e ,F. Lu , H.J. Lubatti , C. Luci , , A. Lucotte , F. Luehring , W. Lukas , L. Luminari ,O. Lundberg , , B. Lund-Jensen , M. Lungwitz , D. Lynn , R. Lysak , E. Lytken , H. Ma ,L.L. Ma , G. Maccarrone , A. Macchiolo , J. Machado Miguens , , D. Macina , D. Madaffari ,R. Madar , H.J. Maddocks , W.F. Mader , A. Madsen , M. Maeno , T. Maeno , E. Magradze ,K. Mahboubi , J. Mahlstedt , S. Mahmoud , C. Maiani , C. Maidantchik , A. Maio , , ,S. Majewski , Y. Makida , N. Makovec , P. Mal ,v , B. Malaescu , Pa. Malecki , V.P. Maleev ,F. Malek , U. Mallik , D. Malon , C. Malone , S. Maltezos , V.M. Malyshev , S. Malyukov , J. Mamuzic ,B. Mandelli , L. Mandelli , I. Mandi´c , R. Mandrysch , J. Maneira , , A. Manfredini ,6L. Manhaes de Andrade Filho , J.A. Manjarres Ramos , A. Mann , P.M. Manning ,A. Manousakis-Katsikakis , B. Mansoulie , R. Mantifel , L. Mapelli , L. March , J.F. Marchand ,G. Marchiori , M. Marcisovsky , C.P. Marino , M. Marjanovic , C.N. Marques , F. Marroquim ,S.P. Marsden , Z. Marshall , L.F. Marti , S. Marti-Garcia , B. Martin , B. Martin , T.A. Martin ,V.J. Martin , B. Martin dit Latour , H. Martinez , M. Martinez ,m , S. Martin-Haugh , A.C. Martyniuk ,M. Marx , F. Marzano , A. Marzin , L. Masetti , T. Mashimo , R. Mashinistov , J. Masik ,A.L. Maslennikov , I. Massa , , N. Massol , P. Mastrandrea , A. Mastroberardino , , T. Masubuchi ,T. Matsushita , P. M¨attig , S. M¨attig , J. Mattmann , J. Maurer , S.J. Maxfield , D.A. Maximov ,q ,R. Mazini , L. Mazzaferro , , G. Mc Goldrick , S.P. Mc Kee , A. McCarn , R.L. McCarthy ,T.G. McCarthy , N.A. McCubbin , K.W. McFarlane , ∗ , J.A. Mcfayden , G. Mchedlidze , S.J. McMahon ,R.A. McPherson ,h , A. Meade , J. Mechnich , M. Medinnis , S. Meehan , S. Mehlhase , A. Mehta ,K. Meier , C. Meineck , B. Meirose , C. Melachrinos , B.R. Mellado Garcia , F. Meloni , ,A. Mengarelli , , S. Menke , E. Meoni , K.M. Mercurio , S. Mergelmeyer , N. Meric , P. Mermod ,L. Merola , , C. Meroni , F.S. Merritt , H. Merritt , A. Messina ,w , J. Metcalfe , A.S. Mete ,C. Meyer , C. Meyer , J-P. Meyer , J. Meyer , R.P. Middleton , S. Migas , L. Mijovi´c , G. Mikenberg ,M. Mikestikova , M. Mikuˇz , D.W. Miller , C. Mills , A. Milov , D.A. Milstead , , D. Milstein ,A.A. Minaenko , I.A. Minashvili , A.I. Mincer , B. Mindur , M. Mineev , Y. Ming , L.M. Mir ,G. Mirabelli , T. Mitani , J. Mitrevski , V.A. Mitsou , S. Mitsui , A. Miucci , P.S. Miyagawa ,J.U. Mj¨ornmark , T. Moa , , K. Mochizuki , V. Moeller , S. Mohapatra , W. Mohr ,S. Molander , , R. Moles-Valls , K. M¨onig , C. Monini , J. Monk , E. Monnier , J. Montejo Berlingen ,F. Monticelli , S. Monzani , , R.W. Moore , A. Moraes , N. Morange , J. Morel , D. Moreno ,M. Moreno Ll´acer , P. Morettini , M. Morgenstern , M. Morii , S. Moritz , A.K. Morley , G. Mornacchi ,J.D. Morris , L. Morvaj , H.G. Moser , M. Mosidze , J. Moss , R. Mount , E. Mountricha ,S.V. Mouraviev , ∗ , E.J.W. Moyse , S. Muanza , R.D. Mudd , F. Mueller , J. Mueller , K. Mueller ,T. Mueller , T. Mueller , D. Muenstermann , Y. Munwes , J.A. Murillo Quijada , W.J. Murray , ,H. Musheghyan , E. Musto , A.G. Myagkov ,x , M. Myska , O. Nackenhorst , J. Nadal , K. Nagai ,R. Nagai , Y. Nagai , K. Nagano , A. Nagarkar , Y. Nagasaka , M. Nagel , A.M. Nairz , Y. Nakahama ,K. Nakamura , T. Nakamura , I. Nakano , H. Namasivayam , G. Nanava , R. Narayan , T. Nattermann ,T. Naumann , G. Navarro , R. Nayyar , H.A. Neal , P.Yu. Nechaeva , T.J. Neep , A. Negri , ,G. Negri , M. Negrini , S. Nektarijevic , A. Nelson , T.K. Nelson , S. Nemecek , P. Nemethy ,A.A. Nepomuceno , M. Nessi ,y , M.S. Neubauer , M. Neumann , R.M. Neves , P. Nevski ,P.R. Newman , D.H. Nguyen , R.B. Nickerson , R. Nicolaidou , B. Nicquevert , J. Nielsen , N. Nikiforou ,A. Nikiforov , V. Nikolaenko ,x , I. Nikolic-Audit , K. Nikolics , K. Nikolopoulos , P. Nilsson , Y. Ninomiya ,A. Nisati , R. Nisius , T. Nobe , L. Nodulman , M. Nomachi , I. Nomidis , S. Norberg ,M. Nordberg , S. Nowak , M. Nozaki , L. Nozka , K. Ntekas , G. Nunes Hanninger , T. Nunnemann ,E. Nurse , F. Nuti , B.J. O’Brien , F. O’grady , D.C. O’Neil , V. O’Shea , F.G. Oakham ,d , H. Oberlack ,T. Obermann , J. Ocariz , A. Ochi , M.I. Ochoa , S. Oda , S. Odaka , H. Ogren , A. Oh , S.H. Oh ,C.C. Ohm , H. Ohman , T. Ohshima , W. Okamura , H. Okawa , Y. Okumura , T. Okuyama ,A. Olariu , A.G. Olchevski , S.A. Olivares Pino , D. Oliveira Damazio , E. Oliver Garcia , A. Olszewski ,J. Olszowska , A. Onofre , , P.U.E. Onyisi ,z , C.J. Oram , M.J. Oreglia , Y. Oren ,D. Orestano , , N. Orlando , , C. Oropeza Barrera , R.S. Orr , B. Osculati , , R. Ospanov ,G. Otero y Garzon , H. Otono , M. Ouchrif , E.A. Ouellette , F. Ould-Saada , A. Ouraou ,K.P. Oussoren , Q. Ouyang , A. Ovcharova , M. Owen , V.E. Ozcan , N. Ozturk , K. Pachal ,A. Pacheco Pages , C. Padilla Aranda , M. Pag´aˇcov´a , S. Pagan Griso , E. Paganis , C. Pahl , F. Paige ,P. Pais , K. Pajchel , G. Palacino , S. Palestini , D. Pallin , A. Palma , , J.D. Palmer , Y.B. Pan ,E. Panagiotopoulou , J.G. Panduro Vazquez , P. Pani , N. Panikashvili , S. Panitkin , D. Pantea ,L. Paolozzi , , Th.D. Papadopoulou , K. Papageorgiou ,k , A. Paramonov , D. Paredes Hernandez ,M.A. Parker , F. Parodi , , J.A. Parsons , U. Parzefall , E. Pasqualucci , S. Passaggio , A. Passeri ,F. Pastore , , ∗ , Fr. Pastore , G. P´asztor , S. Pataraia , N.D. Patel , J.R. Pater , S. Patricelli , ,T. Pauly , J. Pearce , M. Pedersen , S. Pedraza Lopez , R. Pedro , , S.V. Peleganchuk ,D. Pelikan , H. Peng , B. Penning , J. Penwell , D.V. Perepelitsa , E. Perez Codina ,M.T. P´erez Garc´ıa-Esta˜n , V. Perez Reale , L. Perini , , H. Pernegger , R. Perrino , R. Peschke ,V.D. Peshekhonov , K. Peters , R.F.Y. Peters , B.A. Petersen , J. Petersen , T.C. Petersen , E. Petit ,A. Petridis , , C. Petridou , E. Petrolo , F. Petrucci , , M. Petteni , N.E. Pettersson ,R. Pezoa , P.W. Phillips , G. Piacquadio , E. Pianori , A. Picazio , E. Piccaro , M. Piccinini , ,R. Piegaia , D.T. Pignotti , J.E. Pilcher , A.D. Pilkington , J. Pina , , , M. Pinamonti , ,aa ,A. Pinder , J.L. Pinfold , A. Pingel , B. Pinto , S. Pires , M. Pitt , C. Pizio , , M.-A. Pleier ,V. Pleskot , E. Plotnikova , P. Plucinski , , S. Poddar , F. Podlyski , R. Poettgen , L. Poggioli ,7D. Pohl , M. Pohl , G. Polesello , A. Policicchio , , R. Polifka , A. Polini , C.S. Pollard ,V. Polychronakos , K. Pomm`es , L. Pontecorvo , B.G. Pope , G.A. Popeneciu , D.S. Popovic ,A. Poppleton , X. Portell Bueso , G.E. Pospelov , S. Pospisil , K. Potamianos , I.N. Potrap , C.J. Potter ,C.T. Potter , G. Poulard , J. Poveda , V. Pozdnyakov , P. Pralavorio , A. Pranko , S. Prasad ,R. Pravahan , S. Prell , D. Price , J. Price , L.E. Price , D. Prieur , M. Primavera , M. Proissl ,K. Prokofiev , F. Prokoshin , E. Protopapadaki , S. Protopopescu , J. Proudfoot , M. Przybycien ,H. Przysiezniak , E. Ptacek , E. Pueschel , D. Puldon , M. Purohit ,ab , P. Puzo , J. Qian , G. Qin ,Y. Qin , A. Quadt , D.R. Quarrie , W.B. Quayle , , M. Queitsch-Maitland , D. Quilty , A. Qureshi ,V. Radeka , V. Radescu , S.K. Radhakrishnan , P. Radloff , P. Rados , F. Ragusa , , G. Rahal ,S. Rajagopalan , M. Rammensee , A.S. Randle-Conde , C. Rangel-Smith , K. Rao , F. Rauscher ,T.C. Rave , T. Ravenscroft , M. Raymond , A.L. Read , D.M. Rebuzzi , , A. Redelbach ,G. Redlinger , R. Reece , K. Reeves , L. Rehnisch , H. Reisin , M. Relich , C. Rembser , H. Ren ,Z.L. Ren , A. Renaud , M. Rescigno , S. Resconi , O.L. Rezanova ,q , P. Reznicek , R. Rezvani ,R. Richter , M. Ridel , P. Rieck , J. Rieger , M. Rijssenbeek , A. Rimoldi , , L. Rinaldi , E. Ritsch ,I. Riu , F. Rizatdinova , E. Rizvi , S.H. Robertson ,h , A. Robichaud-Veronneau , D. Robinson ,J.E.M. Robinson , A. Robson , C. Roda , , L. Rodrigues , S. Roe , O. Røhne , S. Rolli ,A. Romaniouk , M. Romano , , G. Romeo , E. Romero Adam , N. Rompotis , L. Roos , E. Ros ,S. Rosati , K. Rosbach , M. Rose , P.L. Rosendahl , O. Rosenthal , V. Rossetti , , E. Rossi , ,L.P. Rossi , R. Rosten , M. Rotaru , I. Roth , J. Rothberg , D. Rousseau , C.R. Royon ,A. Rozanov , Y. Rozen , X. Ruan , F. Rubbo , I. Rubinskiy , V.I. Rud , C. Rudolph , M.S. Rudolph ,F. R¨uhr , A. Ruiz-Martinez , Z. Rurikova , N.A. Rusakovich , A. Ruschke , J.P. Rutherfoord ,N. Ruthmann , Y.F. Ryabov , M. Rybar , G. Rybkin , N.C. Ryder , A.F. Saavedra , S. Sacerdoti ,A. Saddique , I. Sadeh , H.F-W. Sadrozinski , R. Sadykov , F. Safai Tehrani , H. Sakamoto ,Y. Sakurai , G. Salamanna , A. Salamon , M. Saleem , D. Salek , P.H. Sales De Bruin , D. Salihagic ,A. Salnikov , J. Salt , B.M. Salvachua Ferrando , D. Salvatore , , F. Salvatore , A. Salvucci ,A. Salzburger , D. Sampsonidis , A. Sanchez , , J. S´anchez , V. Sanchez Martinez , H. Sandaker ,R.L. Sandbach , H.G. Sander , M.P. Sanders , M. Sandhoff , T. Sandoval , C. Sandoval , R. Sandstroem ,D.P.C. Sankey , A. Sansoni , C. Santoni , R. Santonico , , H. Santos , I. Santoyo Castillo ,K. Sapp , A. Sapronov , J.G. Saraiva , , B. Sarrazin , G. Sartisohn , O. Sasaki , Y. Sasaki ,G. Sauvage , ∗ , E. Sauvan , P. Savard ,d , D.O. Savu , C. Sawyer , L. Sawyer ,l , D.H. Saxon , J. Saxon ,C. Sbarra , A. Sbrizzi , T. Scanlon , D.A. Scannicchio , M. Scarcella , J. Schaarschmidt , P. Schacht ,D. Schaefer , R. Schaefer , S. Schaepe , S. Schaetzel , U. Sch¨afer , A.C. Schaffer , D. Schaile ,R.D. Schamberger , V. Scharf , V.A. Schegelsky , D. Scheirich , M. Schernau , M.I. Scherzer ,C. Schiavi , , J. Schieck , C. Schillo , M. Schioppa , , S. Schlenker , E. Schmidt , K. Schmieden ,C. Schmitt , C. Schmitt , S. Schmitt , B. Schneider , Y.J. Schnellbach , U. Schnoor , L. Schoeffel ,A. Schoening , B.D. Schoenrock , A.L.S. Schorlemmer , M. Schott , D. Schouten , J. Schovancova ,S. Schramm , M. Schreyer , C. Schroeder , N. Schuh , M.J. Schultens , H.-C. Schultz-Coulon , H. Schulz ,M. Schumacher , B.A. Schumm , Ph. Schune , C. Schwanenberger , A. Schwartzman , Ph. Schwegler ,Ph. Schwemling , R. Schwienhorst , J. Schwindling , T. Schwindt , M. Schwoerer , F.G. Sciacca , E. Scifo ,G. Sciolla , W.G. Scott , F. Scuri , , F. Scutti , J. Searcy , G. Sedov , E. Sedykh , S.C. Seidel ,A. Seiden , F. Seifert , J.M. Seixas , G. Sekhniaidze , S.J. Sekula , K.E. Selbach , D.M. Seliverstov , ∗ ,G. Sellers , N. Semprini-Cesari , , C. Serfon , L. Serin , L. Serkin , T. Serre , R. Seuster ,H. Severini , F. Sforza , A. Sfyrla , E. Shabalina , M. Shamim , L.Y. Shan , R. Shang , J.T. Shank ,Q.T. Shao , M. Shapiro , P.B. Shatalov , K. Shaw , , P. Sherwood , L. Shi ,ac , S. Shimizu ,C.O. Shimmin , M. Shimojima , M. Shiyakova , A. Shmeleva , M.J. Shochet , D. Short , S. Shrestha ,E. Shulga , M.A. Shupe , S. Shushkevich , P. Sicho , D. Sidorov , A. Sidoti , F. Siegert , Dj. Sijacki ,J. Silva , , Y. Silver , D. Silverstein , S.B. Silverstein , V. Simak , O. Simard , Lj. Simic ,S. Simion , E. Simioni , B. Simmons , R. Simoniello , , M. Simonyan , P. Sinervo , N.B. Sinev ,V. Sipica , G. Siragusa , A. Sircar , A.N. Sisakyan , ∗ , S.Yu. Sivoklokov , J. Sj¨olin , , T.B. Sjursen ,H.P. Skottowe , K.Yu. Skovpen , P. Skubic , M. Slater , T. Slavicek , K. Sliwa , V. Smakhtin ,B.H. Smart , L. Smestad , S.Yu. Smirnov , Y. Smirnov , L.N. Smirnova ,ad , O. Smirnova , K.M. Smith ,M. Smizanska , K. Smolek , A.A. Snesarev , G. Snidero , S. Snyder , R. Sobie ,h , F. Socher , A. Soffer ,D.A. Soh ,ac , C.A. Solans , M. Solar , J. Solc , E.Yu. Soldatov , U. Soldevila ,E. Solfaroli Camillocci , , A.A. Solodkov , O.V. Solovyanov , V. Solovyev , P. Sommer , H.Y. Song ,N. Soni , A. Sood , A. Sopczak , B. Sopko , V. Sopko , V. Sorin , M. Sosebee , R. Soualah , ,P. Soueid , A.M. Soukharev , D. South , S. Spagnolo , , F. Span`o , W.R. Spearman , R. Spighi ,G. Spigo , M. Spousta , T. Spreitzer , B. Spurlock , R.D. St. Denis , S. Staerz , J. Stahlman ,R. Stamen , E. Stanecka , R.W. Stanek , C. Stanescu , M. Stanescu-Bellu , M.M. Stanitzki , S. Stapnes ,8E.A. Starchenko , J. Stark , P. Staroba , P. Starovoitov , R. Staszewski , P. Stavina , ∗ , G. Steele ,P. Steinberg , B. Stelzer , H.J. Stelzer , O. Stelzer-Chilton , H. Stenzel , S. Stern , G.A. Stewart ,J.A. Stillings , M.C. Stockton , M. Stoebe , G. Stoicea , P. Stolte , S. Stonjek , A.R. Stradling ,A. Straessner , M.E. Stramaglia , J. Strandberg , S. Strandberg , , A. Strandlie , E. Strauss ,M. Strauss , P. Strizenec , R. Str¨ohmer , D.M. Strom , R. Stroynowski , S.A. Stucci , B. Stugu ,N.A. Styles , D. Su , J. Su , HS. Subramania , R. Subramaniam , A. Succurro , Y. Sugaya , C. Suhr ,M. Suk , V.V. Sulin , S. Sultansoy , T. Sumida , X. Sun , J.E. Sundermann , K. Suruliz ,G. Susinno , , M.R. Sutton , Y. Suzuki , M. Svatos , S. Swedish , M. Swiatlowski , I. Sykora ,T. Sykora , D. Ta , K. Tackmann , J. Taenzer , A. Taffard , R. Tafirout , N. Taiblum ,Y. Takahashi , H. Takai , R. Takashima , H. Takeda , T. Takeshita , Y. Takubo , M. Talby ,A.A. Talyshev ,q , J.Y.C. Tam , M.C. Tamsett ,ae , K.G. Tan , J. Tanaka , R. Tanaka , S. Tanaka ,S. Tanaka , A.J. Tanasijczuk , K. Tani , N. Tannoury , S. Tapprogge , S. Tarem , F. Tarrade ,G.F. Tartarelli , P. Tas , M. Tasevsky , T. Tashiro , E. Tassi , , A. Tavares Delgado , ,Y. Tayalati , F.E. Taylor , G.N. Taylor , W. Taylor , F.A. Teischinger , M. Teixeira Dias Castanheira ,P. Teixeira-Dias , K.K. Temming , H. Ten Kate , P.K. Teng , J.J. Teoh , S. Terada , K. Terashi ,J. Terron , S. Terzo , M. Testa , R.J. Teuscher ,h , J. Therhaag , T. Theveneaux-Pelzer , S. Thoma ,J.P. Thomas , J. Thomas-Wilsker , E.N. Thompson , P.D. Thompson , P.D. Thompson , A.S. Thompson ,L.A. Thomsen , E. Thomson , M. Thomson , W.M. Thong , R.P. Thun , ∗ , F. Tian , M.J. Tibbetts ,V.O. Tikhomirov ,af , Yu.A. Tikhonov ,q , S. Timoshenko , E. Tiouchichine , P. Tipton , S. Tisserant ,T. Todorov , S. Todorova-Nova , B. Toggerson , J. Tojo , S. Tok´ar , K. Tokushuku , K. Tollefson ,L. Tomlinson , M. Tomoto , L. Tompkins , K. Toms , N.D. Topilin , E. Torrence , H. Torres ,E. Torr´o Pastor , J. Toth ,ag , F. Touchard , D.R. Tovey , H.L. Tran , T. Trefzger , L. Tremblet ,A. Tricoli , I.M. Trigger , S. Trincaz-Duvoid , M.F. Tripiana , N. Triplett , W. Trischuk , B. Trocm´e ,C. Troncon , M. Trottier-McDonald , M. Trovatelli , , P. True , M. Trzebinski , A. Trzupek ,C. Tsarouchas , J.C-L. Tseng , P.V. Tsiareshka , D. Tsionou , G. Tsipolitis , N. Tsirintanis ,S. Tsiskaridze , V. Tsiskaridze , E.G. Tskhadadze , I.I. Tsukerman , V. Tsulaia , S. Tsuno ,D. Tsybychev , A. Tudorache , V. Tudorache , A.N. Tuna , S.A. Tupputi , , S. Turchikhin ,ad ,D. Turecek , I. Turk Cakir , R. Turra , , P.M. Tuts , A. Tykhonov , M. Tylmad , , M. Tyndel ,K. Uchida , I. Ueda , R. Ueno , M. Ughetto , M. Ugland , M. Uhlenbrock , F. Ukegawa , G. Unal ,A. Undrus , G. Unel , F.C. Ungaro , Y. Unno , D. Urbaniec , P. Urquijo , G. Usai , A. Usanova ,L. Vacavant , V. Vacek , B. Vachon , N. Valencic , S. Valentinetti , , A. Valero , L. Valery ,S. Valkar , E. Valladolid Gallego , S. Vallecorsa , J.A. Valls Ferrer , P.C. Van Der Deijl ,R. van der Geer , H. van der Graaf , R. Van Der Leeuw , D. van der Ster , N. van Eldik ,P. van Gemmeren , J. Van Nieuwkoop , I. van Vulpen , M.C. van Woerden , M. Vanadia , ,W. Vandelli , R. Vanguri , A. Vaniachine , P. Vankov , F. Vannucci , G. Vardanyan , R. Vari ,E.W. Varnes , T. Varol , D. Varouchas , A. Vartapetian , K.E. Varvell , F. Vazeille , T. Vazquez Schroeder ,J. Veatch , F. Veloso , , S. Veneziano , A. Ventura , , D. Ventura , M. Venturi , N. Venturi ,A. Venturini , V. Vercesi , M. Verducci , W. Verkerke , J.C. Vermeulen , A. Vest , M.C. Vetterli ,d ,O. Viazlo , I. Vichou , T. Vickey ,ah , O.E. Vickey Boeriu , G.H.A. Viehhauser , S. Viel , R. Vigne ,M. Villa , , M. Villaplana Perez , E. Vilucchi , M.G. Vincter , V.B. Vinogradov , J. Virzi , I. Vivarelli ,F. Vives Vaque , S. Vlachos , D. Vladoiu , M. Vlasak , A. Vogel , M. Vogel , P. Vokac , G. Volpi , ,M. Volpi , H. von der Schmitt , H. von Radziewski , E. von Toerne , V. Vorobel , K. Vorobev , M. Vos ,R. Voss , J.H. Vossebeld , N. Vranjes , M. Vranjes Milosavljevic , V. Vrba , M. Vreeswijk , T. Vu Anh ,R. Vuillermet , I. Vukotic , Z. Vykydal , P. Wagner , W. Wagner , S. Wahrmund , J. Wakabayashi ,J. Walder , R. Walker , W. Walkowiak , R. Wall , P. Waller , B. Walsh , C. Wang ,ai , C. Wang ,F. Wang , H. Wang , H. Wang , J. Wang , J. Wang , K. Wang , R. Wang , S.M. Wang , T. Wang ,X. Wang , C. Wanotayaroj , A. Warburton , C.P. Ward , D.R. Wardrope , M. Warsinsky , A. Washbrook ,C. Wasicki , I. Watanabe , P.M. Watkins , A.T. Watson , I.J. Watson , M.F. Watson , G. Watts ,S. Watts , B.M. Waugh , S. Webb , M.S. Weber , S.W. Weber , J.S. Webster , A.R. Weidberg ,P. Weigell , B. Weinert , J. Weingarten , C. Weiser , H. Weits , P.S. Wells , T. Wenaus , D. Wendland ,Z. Weng ,ac , T. Wengler , S. Wenig , N. Wermes , M. Werner , P. Werner , M. Wessels , J. Wetter ,K. Whalen , A. White , M.J. White , R. White , S. White , , D. Whiteson , D. Wicke ,F.J. Wickens , W. Wiedenmann , M. Wielers , P. Wienemann , C. Wiglesworth , L.A.M. Wiik-Fuchs ,P.A. Wijeratne , A. Wildauer , M.A. Wildt ,aj , H.G. Wilkens , J.Z. Will , H.H. Williams , S. Williams ,C. Willis , S. Willocq , A. Wilson , J.A. Wilson , I. Wingerter-Seez , F. Winklmeier , B.T. Winter ,M. Wittgen , T. Wittig , J. Wittkowski , S.J. Wollstadt , M.W. Wolter , H. Wolters , , B.K. Wosiek ,J. Wotschack , M.J. Woudstra , K.W. Wozniak , M. Wright , M. Wu , S.L. Wu , X. Wu , Y. Wu ,E. Wulf , T.R. Wyatt , B.M. Wynne , S. Xella , M. Xiao , D. Xu , L. Xu ,ak , B. Yabsley ,9S. Yacoob ,al , M. Yamada , H. Yamaguchi , Y. Yamaguchi , A. Yamamoto , K. Yamamoto ,S. Yamamoto , T. Yamamura , T. Yamanaka , K. Yamauchi , Y. Yamazaki , Z. Yan , H. Yang ,H. Yang , U.K. Yang , Y. Yang , S. Yanush , L. Yao , W-M. Yao , Y. Yasu , E. Yatsenko ,K.H. Yau Wong , J. Ye , S. Ye , A.L. Yen , E. Yildirim , M. Yilmaz , R. Yoosoofmiya , K. Yorita ,R. Yoshida , K. Yoshihara , C. Young , C.J.S. Young , S. Youssef , D.R. Yu , J. Yu , J.M. Yu , J. Yu ,L. Yuan , A. Yurkewicz , B. Zabinski , R. Zaidan , A.M. Zaitsev ,x , A. Zaman , S. Zambito ,L. Zanello , , D. Zanzi , A. Zaytsev , C. Zeitnitz , M. Zeman , A. Zemla , K. Zengel , O. Zenin ,T. ˇZeniˇs , D. Zerwas , G. Zevi della Porta , D. Zhang , F. Zhang , H. Zhang , J. Zhang , L. Zhang ,X. Zhang , Z. Zhang , Z. Zhao , A. Zhemchugov , J. Zhong , B. Zhou , L. Zhou , N. Zhou ,C.G. Zhu , H. Zhu , J. Zhu , Y. Zhu , X. Zhuang , A. Zibell , D. Zieminska , N.I. Zimine ,C. Zimmermann , R. Zimmermann , S. Zimmermann , S. Zimmermann , Z. Zinonos , M. Ziolkowski ,G. Zobernig , A. Zoccoli , , M. zur Nedden , G. Zurzolo , , V. Zutshi , L. Zwalinski . Department of Physics, University of Adelaide, Adelaide, Australia Physics Department, SUNY Albany, Albany NY, United States of America Department of Physics, University of Alberta, Edmonton AB, Canada a ) Department of Physics, Ankara University, Ankara; ( b ) Department of Physics, Gazi University, Ankara; ( c ) Division of Physics, TOBB University of Economics and Technology, Ankara; ( d ) Turkish Atomic Energy Authority,Ankara, Turkey LAPP, CNRS/IN2P3 and Universit´e de Savoie, Annecy-le-Vieux, France High Energy Physics Division, Argonne National Laboratory, Argonne IL, United States of America Department of Physics, University of Arizona, Tucson AZ, United States of America Department of Physics, The University of Texas at Arlington, Arlington TX, United States of America Physics Department, University of Athens, Athens, Greece Physics Department, National Technical University of Athens, Zografou, Greece Institute of Physics, Azerbaijan Academy of Sciences, Baku, Azerbaijan Institut de F´ısica d’Altes Energies and Departament de F´ısica de la Universitat Aut`onoma de Barcelona,Barcelona, Spain
13 ( a ) Institute of Physics, University of Belgrade, Belgrade; ( b ) Vinca Institute of Nuclear Sciences, University ofBelgrade, Belgrade, Serbia Department for Physics and Technology, University of Bergen, Bergen, Norway Physics Division, Lawrence Berkeley National Laboratory and University of California, Berkeley CA, UnitedStates of America Department of Physics, Humboldt University, Berlin, Germany Albert Einstein Center for Fundamental Physics and Laboratory for High Energy Physics, University of Bern,Bern, Switzerland School of Physics and Astronomy, University of Birmingham, Birmingham, United Kingdom
19 ( a ) Department of Physics, Bogazici University, Istanbul; ( b ) Department of Physics, Dogus University, Istanbul; ( c ) Department of Physics Engineering, Gaziantep University, Gaziantep, Turkey
20 ( a ) INFN Sezione di Bologna; ( b ) Dipartimento di Fisica e Astronomia, Universit`a di Bologna, Bologna, Italy Physikalisches Institut, University of Bonn, Bonn, Germany Department of Physics, Boston University, Boston MA, United States of America Department of Physics, Brandeis University, Waltham MA, United States of America
24 ( a ) Universidade Federal do Rio De Janeiro COPPE/EE/IF, Rio de Janeiro; ( b ) Federal University of Juiz de Fora(UFJF), Juiz de Fora; ( c ) Federal University of Sao Joao del Rei (UFSJ), Sao Joao del Rei; ( d ) Instituto de Fisica,Universidade de Sao Paulo, Sao Paulo, Brazil Physics Department, Brookhaven National Laboratory, Upton NY, United States of America
26 ( a ) National Institute of Physics and Nuclear Engineering, Bucharest; ( b ) National Institute for Research andDevelopment of Isotopic and Molecular Technologies, Physics Department, Cluj Napoca; ( c ) University PolitehnicaBucharest, Bucharest; ( d ) West University in Timisoara, Timisoara, Romania Departamento de F´ısica, Universidad de Buenos Aires, Buenos Aires, Argentina Cavendish Laboratory, University of Cambridge, Cambridge, United Kingdom Department of Physics, Carleton University, Ottawa ON, Canada CERN, Geneva, Switzerland Enrico Fermi Institute, University of Chicago, Chicago IL, United States of America
32 ( a ) Departamento de F´ısica, Pontificia Universidad Cat´olica de Chile, Santiago; ( b ) Departamento de F´ısica,Universidad T´ecnica Federico Santa Mar´ıa, Valpara´ıso, Chile
33 ( a ) Institute of High Energy Physics, Chinese Academy of Sciences, Beijing; ( b ) Department of Modern Physics,0University of Science and Technology of China, Anhui; ( c ) Department of Physics, Nanjing University, Jiangsu; ( d ) School of Physics, Shandong University, Shandong; ( e ) Physics Department, Shanghai Jiao Tong University,Shanghai, China Laboratoire de Physique Corpusculaire, Clermont Universit´e and Universit´e Blaise Pascal and CNRS/IN2P3,Clermont-Ferrand, France Nevis Laboratory, Columbia University, Irvington NY, United States of America Niels Bohr Institute, University of Copenhagen, Kobenhavn, Denmark
37 ( a ) INFN Gruppo Collegato di Cosenza, Laboratori Nazionali di Frascati; ( b ) Dipartimento di Fisica, Universit`adella Calabria, Rende, Italy
38 ( a ) AGH University of Science and Technology, Faculty of Physics and Applied Computer Science, Krakow; ( b ) Marian Smoluchowski Institute of Physics, Jagiellonian University, Krakow, Poland The Henryk Niewodniczanski Institute of Nuclear Physics, Polish Academy of Sciences, Krakow, Poland Physics Department, Southern Methodist University, Dallas TX, United States of America Physics Department, University of Texas at Dallas, Richardson TX, United States of America DESY, Hamburg and Zeuthen, Germany Institut f¨ur Experimentelle Physik IV, Technische Universit¨at Dortmund, Dortmund, Germany Institut f¨ur Kern- und Teilchenphysik, Technische Universit¨at Dresden, Dresden, Germany Department of Physics, Duke University, Durham NC, United States of America SUPA - School of Physics and Astronomy, University of Edinburgh, Edinburgh, United Kingdom INFN Laboratori Nazionali di Frascati, Frascati, Italy Fakult¨at f¨ur Mathematik und Physik, Albert-Ludwigs-Universit¨at, Freiburg, Germany Section de Physique, Universit´e de Gen`eve, Geneva, Switzerland
50 ( a ) INFN Sezione di Genova; ( b ) Dipartimento di Fisica, Universit`a di Genova, Genova, Italy
51 ( a ) E. Andronikashvili Institute of Physics, Iv. Javakhishvili Tbilisi State University, Tbilisi; ( b ) High EnergyPhysics Institute, Tbilisi State University, Tbilisi, Georgia II Physikalisches Institut, Justus-Liebig-Universit¨at Giessen, Giessen, Germany SUPA - School of Physics and Astronomy, University of Glasgow, Glasgow, United Kingdom II Physikalisches Institut, Georg-August-Universit¨at, G¨ottingen, Germany Laboratoire de Physique Subatomique et de Cosmologie, Universit´e Grenoble-Alpes, CNRS/IN2P3, Grenoble,France Department of Physics, Hampton University, Hampton VA, United States of America Laboratory for Particle Physics and Cosmology, Harvard University, Cambridge MA, United States of America
58 ( a ) Kirchhoff-Institut f¨ur Physik, Ruprecht-Karls-Universit¨at Heidelberg, Heidelberg; ( b ) Physikalisches Institut,Ruprecht-Karls-Universit¨at Heidelberg, Heidelberg; ( c ) ZITI Institut f¨ur technische Informatik,Ruprecht-Karls-Universit¨at Heidelberg, Mannheim, Germany Faculty of Applied Information Science, Hiroshima Institute of Technology, Hiroshima, Japan Department of Physics, Indiana University, Bloomington IN, United States of America Institut f¨ur Astro- und Teilchenphysik, Leopold-Franzens-Universit¨at, Innsbruck, Austria University of Iowa, Iowa City IA, United States of America Department of Physics and Astronomy, Iowa State University, Ames IA, United States of America Joint Institute for Nuclear Research, JINR Dubna, Dubna, Russia KEK, High Energy Accelerator Research Organization, Tsukuba, Japan Graduate School of Science, Kobe University, Kobe, Japan Faculty of Science, Kyoto University, Kyoto, Japan Kyoto University of Education, Kyoto, Japan Department of Physics, Kyushu University, Fukuoka, Japan Instituto de F´ısica La Plata, Universidad Nacional de La Plata and CONICET, La Plata, Argentina Physics Department, Lancaster University, Lancaster, United Kingdom
72 ( a ) INFN Sezione di Lecce; ( b ) Dipartimento di Matematica e Fisica, Universit`a del Salento, Lecce, Italy Oliver Lodge Laboratory, University of Liverpool, Liverpool, United Kingdom Department of Physics, Joˇzef Stefan Institute and University of Ljubljana, Ljubljana, Slovenia School of Physics and Astronomy, Queen Mary University of London, London, United Kingdom Department of Physics, Royal Holloway University of London, Surrey, United Kingdom Department of Physics and Astronomy, University College London, London, United Kingdom Louisiana Tech University, Ruston LA, United States of America Laboratoire de Physique Nucl´eaire et de Hautes Energies, UPMC and Universit´e Paris-Diderot andCNRS/IN2P3, Paris, France Fysiska institutionen, Lunds universitet, Lund, Sweden1 Departamento de Fisica Teorica C-15, Universidad Autonoma de Madrid, Madrid, Spain Institut f¨ur Physik, Universit¨at Mainz, Mainz, Germany School of Physics and Astronomy, University of Manchester, Manchester, United Kingdom CPPM, Aix-Marseille Universit´e and CNRS/IN2P3, Marseille, France Department of Physics, University of Massachusetts, Amherst MA, United States of America Department of Physics, McGill University, Montreal QC, Canada School of Physics, University of Melbourne, Victoria, Australia Department of Physics, The University of Michigan, Ann Arbor MI, United States of America Department of Physics and Astronomy, Michigan State University, East Lansing MI, United States of America
90 ( a ) INFN Sezione di Milano; ( b ) Dipartimento di Fisica, Universit`a di Milano, Milano, Italy B.I. Stepanov Institute of Physics, National Academy of Sciences of Belarus, Minsk, Republic of Belarus National Scientific and Educational Centre for Particle and High Energy Physics, Minsk, Republic of Belarus Department of Physics, Massachusetts Institute of Technology, Cambridge MA, United States of America Group of Particle Physics, University of Montreal, Montreal QC, Canada P.N. Lebedev Institute of Physics, Academy of Sciences, Moscow, Russia Institute for Theoretical and Experimental Physics (ITEP), Moscow, Russia Moscow Engineering and Physics Institute (MEPhI), Moscow, Russia D.V.Skobeltsyn Institute of Nuclear Physics, M.V.Lomonosov Moscow State University, Moscow, Russia Fakult¨at f¨ur Physik, Ludwig-Maximilians-Universit¨at M¨unchen, M¨unchen, Germany
Max-Planck-Institut f¨ur Physik (Werner-Heisenberg-Institut), M¨unchen, Germany
Nagasaki Institute of Applied Science, Nagasaki, Japan
Graduate School of Science and Kobayashi-Maskawa Institute, Nagoya University, Nagoya, Japan
103 ( a ) INFN Sezione di Napoli; ( b ) Dipartimento di Fisica, Universit`a di Napoli, Napoli, Italy
Department of Physics and Astronomy, University of New Mexico, Albuquerque NM, United States of America
Institute for Mathematics, Astrophysics and Particle Physics, Radboud University Nijmegen/Nikhef, Nijmegen,Netherlands
Nikhef National Institute for Subatomic Physics and University of Amsterdam, Amsterdam, Netherlands
Department of Physics, Northern Illinois University, DeKalb IL, United States of America
Budker Institute of Nuclear Physics, SB RAS, Novosibirsk, Russia
Department of Physics, New York University, New York NY, United States of America
Ohio State University, Columbus OH, United States of America
Faculty of Science, Okayama University, Okayama, Japan
Homer L. Dodge Department of Physics and Astronomy, University of Oklahoma, Norman OK, United States ofAmerica
Department of Physics, Oklahoma State University, Stillwater OK, United States of America
Palack´y University, RCPTM, Olomouc, Czech Republic
Center for High Energy Physics, University of Oregon, Eugene OR, United States of America
LAL, Universit´e Paris-Sud and CNRS/IN2P3, Orsay, France
Graduate School of Science, Osaka University, Osaka, Japan
Department of Physics, University of Oslo, Oslo, Norway
Department of Physics, Oxford University, Oxford, United Kingdom
120 ( a ) INFN Sezione di Pavia; ( b ) Dipartimento di Fisica, Universit`a di Pavia, Pavia, Italy
Department of Physics, University of Pennsylvania, Philadelphia PA, United States of America
Petersburg Nuclear Physics Institute, Gatchina, Russia
123 ( a ) INFN Sezione di Pisa; ( b ) Dipartimento di Fisica E. Fermi, Universit`a di Pisa, Pisa, Italy
Department of Physics and Astronomy, University of Pittsburgh, Pittsburgh PA, United States of America
125 ( a ) Laboratorio de Instrumentacao e Fisica Experimental de Particulas - LIP, Lisboa; ( b ) Faculdade de Ciˆencias,Universidade de Lisboa, Lisboa; ( c ) Department of Physics, University of Coimbra, Coimbra; ( d ) Centro de F´ısicaNuclear da Universidade de Lisboa, Lisboa; ( e ) Departamento de Fisica, Universidade do Minho, Braga; ( f ) Departamento de Fisica Teorica y del Cosmos and CAFPE, Universidad de Granada, Granada (Spain); ( g ) DepFisica and CEFITEC of Faculdade de Ciencias e Tecnologia, Universidade Nova de Lisboa, Caparica, Portugal
Institute of Physics, Academy of Sciences of the Czech Republic, Praha, Czech Republic
Czech Technical University in Prague, Praha, Czech Republic
Faculty of Mathematics and Physics, Charles University in Prague, Praha, Czech Republic
State Research Center Institute for High Energy Physics, Protvino, Russia
Particle Physics Department, Rutherford Appleton Laboratory, Didcot, United Kingdom
Physics Department, University of Regina, Regina SK, Canada
Ritsumeikan University, Kusatsu, Shiga, Japan2
133 ( a ) INFN Sezione di Roma; ( b ) Dipartimento di Fisica, Sapienza Universit`a di Roma, Roma, Italy
134 ( a ) INFN Sezione di Roma Tor Vergata; ( b ) Dipartimento di Fisica, Universit`a di Roma Tor Vergata, Roma, Italy
135 ( a ) INFN Sezione di Roma Tre; ( b ) Dipartimento di Matematica e Fisica, Universit`a Roma Tre, Roma, Italy
136 ( a ) Facult´e des Sciences Ain Chock, R´eseau Universitaire de Physique des Hautes Energies - Universit´e HassanII, Casablanca; ( b ) Centre National de l’Energie des Sciences Techniques Nucleaires, Rabat; ( c ) Facult´e des SciencesSemlalia, Universit´e Cadi Ayyad, LPHEA-Marrakech; ( d ) Facult´e des Sciences, Universit´e Mohamed Premier andLPTPM, Oujda; ( e ) Facult´e des sciences, Universit´e Mohammed V-Agdal, Rabat, Morocco
DSM/IRFU (Institut de Recherches sur les Lois Fondamentales de l’Univers), CEA Saclay (Commissariat `al’Energie Atomique et aux Energies Alternatives), Gif-sur-Yvette, France
Santa Cruz Institute for Particle Physics, University of California Santa Cruz, Santa Cruz CA, United States ofAmerica
Department of Physics, University of Washington, Seattle WA, United States of America
Department of Physics and Astronomy, University of Sheffield, Sheffield, United Kingdom
Department of Physics, Shinshu University, Nagano, Japan
Fachbereich Physik, Universit¨at Siegen, Siegen, Germany
Department of Physics, Simon Fraser University, Burnaby BC, Canada
SLAC National Accelerator Laboratory, Stanford CA, United States of America
145 ( a ) Faculty of Mathematics, Physics & Informatics, Comenius University, Bratislava; ( b ) Department ofSubnuclear Physics, Institute of Experimental Physics of the Slovak Academy of Sciences, Kosice, Slovak Republic
146 ( a ) Department of Physics, University of Cape Town, Cape Town; ( b ) Department of Physics, University ofJohannesburg, Johannesburg; ( c ) School of Physics, University of the Witwatersrand, Johannesburg, South Africa
147 ( a ) Department of Physics, Stockholm University; ( b ) The Oskar Klein Centre, Stockholm, Sweden
Physics Department, Royal Institute of Technology, Stockholm, Sweden
Departments of Physics & Astronomy and Chemistry, Stony Brook University, Stony Brook NY, United Statesof America
Department of Physics and Astronomy, University of Sussex, Brighton, United Kingdom
School of Physics, University of Sydney, Sydney, Australia
Institute of Physics, Academia Sinica, Taipei, Taiwan
Department of Physics, Technion: Israel Institute of Technology, Haifa, Israel
Raymond and Beverly Sackler School of Physics and Astronomy, Tel Aviv University, Tel Aviv, Israel
Department of Physics, Aristotle University of Thessaloniki, Thessaloniki, Greece
International Center for Elementary Particle Physics and Department of Physics, The University of Tokyo,Tokyo, Japan
Graduate School of Science and Technology, Tokyo Metropolitan University, Tokyo, Japan
Department of Physics, Tokyo Institute of Technology, Tokyo, Japan
Department of Physics, University of Toronto, Toronto ON, Canada
160 ( a ) TRIUMF, Vancouver BC; ( b ) Department of Physics and Astronomy, York University, Toronto ON, Canada
Faculty of Pure and Applied Sciences, University of Tsukuba, Tsukuba, Japan
Department of Physics and Astronomy, Tufts University, Medford MA, United States of America
Centro de Investigaciones, Universidad Antonio Narino, Bogota, Colombia
Department of Physics and Astronomy, University of California Irvine, Irvine CA, United States of America
165 ( a ) INFN Gruppo Collegato di Udine, Sezione di Trieste, Udine; ( b ) ICTP, Trieste; ( c ) Dipartimento di Chimica,Fisica e Ambiente, Universit`a di Udine, Udine, Italy
Department of Physics, University of Illinois, Urbana IL, United States of America
Department of Physics and Astronomy, University of Uppsala, Uppsala, Sweden
Instituto de F´ısica Corpuscular (IFIC) and Departamento de F´ısica At´omica, Molecular y Nuclear andDepartamento de Ingenier´ıa Electr´onica and Instituto de Microelectr´onica de Barcelona (IMB-CNM), University ofValencia and CSIC, Valencia, Spain
Department of Physics, University of British Columbia, Vancouver BC, Canada
Department of Physics and Astronomy, University of Victoria, Victoria BC, Canada
Department of Physics, University of Warwick, Coventry, United Kingdom
Waseda University, Tokyo, Japan
Department of Particle Physics, The Weizmann Institute of Science, Rehovot, Israel
Department of Physics, University of Wisconsin, Madison WI, United States of America
Fakult¨at f¨ur Physik und Astronomie, Julius-Maximilians-Universit¨at, W¨urzburg, Germany
Fachbereich C Physik, Bergische Universit¨at Wuppertal, Wuppertal, Germany
Department of Physics, Yale University, New Haven CT, United States of America
Yerevan Physics Institute, Yerevan, Armenia3
Centre de Calcul de l’Institut National de Physique Nucl´eaire et de Physique des Particules (IN2P3),Villeurbanne, France a Also at Department of Physics, King’s College London, London, United Kingdom b Also at Institute of Physics, Azerbaijan Academy of Sciences, Baku, Azerbaijan c Also at Particle Physics Department, Rutherford Appleton Laboratory, Didcot, United Kingdom d Also at TRIUMF, Vancouver BC, Canada e Also at Department of Physics, California State University, Fresno CA, United States of America f Also at CPPM, Aix-Marseille Universit´e and CNRS/IN2P3, Marseille, France g Also at Universit`a di Napoli Parthenope, Napoli, Italy h Also at Institute of Particle Physics (IPP), Canada i Also at Department of Physics, St. Petersburg State Polytechnical University, St. Petersburg, Russia j Also at Chinese University of Hong Kong, China k Also at Department of Financial and Management Engineering, University of the Aegean, Chios, Greece l Also at Louisiana Tech University, Ruston LA, United States of America m Also at Institucio Catalana de Recerca i Estudis Avancats, ICREA, Barcelona, Spain n Also at CERN, Geneva, Switzerland o Also at Ochadai Academic Production, Ochanomizu University, Tokyo, Japan p Also at Manhattan College, New York NY, United States of America q Also at Novosibirsk State University, Novosibirsk, Russia r Also at Institute of Physics, Academia Sinica, Taipei, Taiwan s Also at LAL, Universit´e Paris-Sud and CNRS/IN2P3, Orsay, France t Also at Academia Sinica Grid Computing, Institute of Physics, Academia Sinica, Taipei, Taiwan u Also at Laboratoire de Physique Nucl´eaire et de Hautes Energies, UPMC and Universit´e Paris-Diderot andCNRS/IN2P3, Paris, France v Also at School of Physical Sciences, National Institute of Science Education and Research, Bhubaneswar, India w Also at Dipartimento di Fisica, Sapienza Universit`a di Roma, Roma, Italy x Also at Moscow Institute of Physics and Technology State University, Dolgoprudny, Russia y Also at Section de Physique, Universit´e de Gen`eve, Geneva, Switzerland z Also at Department of Physics, The University of Texas at Austin, Austin TX, United States of America aa Also at International School for Advanced Studies (SISSA), Trieste, Italy ab Also at Department of Physics and Astronomy, University of South Carolina, Columbia SC, United States ofAmerica ac Also at School of Physics and Engineering, Sun Yat-sen University, Guangzhou, China ad Also at Faculty of Physics, M.V.Lomonosov Moscow State University, Moscow, Russia ae Also at Physics Department, Brookhaven National Laboratory, Upton NY, United States of America af Also at Moscow Engineering and Physics Institute (MEPhI), Moscow, Russia ag Also at Institute for Particle and Nuclear Physics, Wigner Research Centre for Physics, Budapest, Hungary ah Also at Department of Physics, Oxford University, Oxford, United Kingdom ai Also at Department of Physics, Nanjing University, Jiangsu, China aj Also at Institut f¨ur Experimentalphysik, Universit¨at Hamburg, Hamburg, Germany ak Also at Department of Physics, The University of Michigan, Ann Arbor MI, United States of America al Also at Discipline of Physics, University of KwaZulu-Natal, Durban, South Africa ∗∗