Current constraints on the EFT for the ΛN --> N N transition
IICCUB-11-134
Current constraints on the EFT for the Λ N → N N transition
Axel P´erez-Obiol, ∗ Assumpta Parre˜no, † and Bruno Juli´a-D´ıaz
1, 2, ‡ Departament d’Estructura i Constituents de la Mat`eria,Institut de Ci`encies del Cosmos (ICC),Universitat de Barcelona, Mart´ı Franqu`es 1, E–08028, Spain ICFO-Institut de Ci`encies Fot`oniques, Parc Mediterrani de la Tecnologia, E-08860 Castelldefels (Barcelona), Spain (Dated: October 30, 2018)The relation between the low energy constants appearing in the effective field theory description ofthe Λ N → NN transition potential and the parameters of the one-meson-exchange model previouslydeveloped are obtained. We extract the relative importance of the different exchange mechanismsincluded in the meson picture by means of a comparison to the corresponding operational structuresappearing in the effective approach. The ability of this procedure to obtain the weak baryon-baryon-meson couplings for a possible scalar exchange is also discussed. PACS numbers: 13.75.Ev, 21.80.+a, 25.80.Pw, 13.30.Eg
I. INTRODUCTION
The use of effective field theory (EFT) approachesprovides a systematic way of handling nonperturbativestrong interaction physics. In particular, it is appeal-ing for the description of the short-distance physics ofbaryon-baryon interactions.The EFT for the nonleptonic weak | ∆ S | = 1 Λ N inter-action, which is the main responsible for the nonmesonicdecay of mostly all hypernuclei was first formulated inRefs. [1] and [2]. While the authors in [1] constructed theeffective theory by adding to the long-ranged one-pion-exchange mechanism (OPE) a four-fermion point inter-action, coming from Lorentz four-vector currents, Ref. [2]added the K - exchange mechanism (OKE) to the inter-mediate range of the interaction, as well as additionaloperational structures to the short range part of the tran-sition potential. These structures result when all possibleoperators compatible with the symmetries fulfilled by theweak | ∆ S | = 1 Λ N interaction are considered. The lo-cal operators governing short distance dynamics in anyEFT appear in the Lagrangian multiplied by low energyconstants (LECs), which have to be determined by a fitto the available experimental data. Although neither theamount nor the quality of hypernuclear weak decay datais comparable with the wealth of information availablein the nonstrange sector, these data are enough to fairlyconstrain the lowest order LECs. In order to provide ahigher order description of the weak 4-fermion interac-tion, and therefore, a deeper understanding of the fun-damental dynamics involved, more and better data areneeded, or in their absence, a mapping to successful one-meson-exchange (OME) models can be performed. Un-derstanding these low energy constants in terms of phys-ical ingredients of the OME models, as masses, strong ∗ [email protected] † [email protected] ‡ [email protected] form factor parameters and couplings of pseudoscalarand vector mesons to baryons, is called resonance sat-uration [3] and it is the aim of the present manuscript.The present work is partly motivated by the possiblepresence of an isoscalar spin independent central transi-tion operator in the weak decay mechanism, and its rele-vant role in the prediction of some hypernuclear decay ob-servables [2, 4, 6]. This operational structure would mapa scalar σ − meson resonance in the traditional meson-exchange picture. The fact that the σ does not belongto the ground state meson octet has prevented its in-clusion in many OME treatments of the weak transitionamplitude. Some works, however, have included the phe-nomenological exchange of a correlated 2- π (and/or 2- ρ pair) state coupled to a scalar-isoscalar channel, under-stood as a σ resonance [7–10], and pointed out its rele-vance to determine the strength of some particular transi-tion amplitudes. The publication of new accurate data onhypernuclear decay observables during the last five years,makes it timely to revise the calculation of Ref. [2], andexplore the feasibility of the EFT approach to constrainthe weak baryon-baryon-sigma coupling constants.To facilitate the reading of the present manuscript, andalthough the EFT formalism as well as the OME one weredeveloped and presented elsewhere, we choose to includehere an schematic overview of basics, together with thefinal relations governing the weak dynamics according toeach one of the approaches. II. THE MESON EXCHANGE POTENTIAL
The Λ hyperon decays in free space through the non-leptonic weak decay modes Λ → nπ and Λ → pπ − ,with an approximate ratio of 36:64. This mechanismis highly suppressed in the nuclear medium, since themomentum of the nucleon in the final state is not largeenough to access unoccupied states above the Fermi en-ergy level. However, hypernuclear systems decay, pre-cisely due to the presence of surrounding nucleons, bymeans of single-, Γ N = Λ N → N N , and multi-nucleon a r X i v : . [ nu c l - t h ] A p r FIG. 1: Non-strange (a) and strange (b) meson-exchangecontributions to the ΛN → NN weak transition potential. Aweak insertion is indicated by the empty square, while a filledsquare stands for a strong interaction vertex. induced decay mechanisms. Recently, the detection oftwo nucleons in coincidence in the final state [11–13] hasallowed a more reliable extraction not only of the totalnonmesonic decay rate, but also of the ratio between theneutron induced process (Λ n → nn ) and the proton in-duced one (Λ p → np ), Γ n / Γ p [14, 15]. The analysis ofthe data points out that, in order to isolate the physicalregion where medium effects and multinucleon inducedprocesses are minimal, one needs to study the energyand angular correlated spectra for the particles detectedin the final state, instead of looking at the absolute valuesfor the partial and total decay rates. Additionally, exper-iments performed with polarized hypernuclei, provide uswith a measure of the asymmetry in the angular distri-bution of protons in the final state, asymmetry that canbe understood from the interference between the parity-conserving (PC) and parity-violating (PV) weak ampli-tudes. The explicit expressions for the different decayrates, as well as the PV asymmetry, can be found in theoriginal reference [16].Traditionally, and in analogy with the strong N N in-teraction, the one-nucleon induced decay mode, Λ N → N N , has been described by a one-boson-exchange model,according to which, a pion emitted at the weak Λ N ver-tex is absorbed by the N N pair at the strong one. Whilemesons other than the pion would be forbidden for thedecay of the Λ particle in free space, there is no restric-tion for the off-shell exchange of massive bosons. In theconsidered energy domain, one needs to explicitly con-sider the exchange of the ground state of pseudoscalarand vector meson octets. Higher energy physics is pa-rameterized through explicit cut-offs of ≈ V π ( (cid:126)q ) = − G F m π g M S (cid:32) ˆ A + ˆ B M W (cid:126)σ (cid:126)q (cid:33) (cid:126)σ (cid:126)q(cid:126)q + µ , (2.1) where (cid:126)q = (cid:126)p − (cid:126)p is the momentum carried by the piondirected towards the strong vertex, g = g NN π the strongcoupling constant for the NN π vertex, µ the pion mass, M S ( M W ) the average of the baryon masses at the strong(weak) vertex, and ˆ A = A π (cid:126)τ (cid:126)τ and ˆ B = B π (cid:126)τ (cid:126)τ theisospin operators containing the weak parity-violatingand parity-conserving coupling constants.The η and K exchanges, whose strong and weak ver-tices are again explicitly given in Appendix A, can beobtained from Eq. (2.1) by making the replacements: g → g NN η , µ → m η , ˆ A → A η , ˆ B → B η in the case of η -exchange, and g → g ΛN K , µ → m K , ˆ A → (cid:18) C PVK D PVK + C PVK (cid:126)τ (cid:126)τ (cid:19) , ˆ B → (cid:18) C PCK D PCK + C PCK (cid:126)τ (cid:126)τ (cid:19) (2.2)in the case of K-exchange.The short-range one-meson-exchange Λ N interactionis supplemented by the inclusion of more massive bosons,up to a mass of around 1 GeV, the ρ, ω and K ∗ mesons.For the ρ -meson, for example, the non relativistic reduc-tion of the pertinent Feynman amplitude, computed us-ing the vertices of Appendix A, gives the following tran-sition potential: V ρ ( (cid:126)q ) = (cid:34) F ˆ α − (ˆ α + ˆ β )( F + F )4 M S M W ( (cid:126)σ × (cid:126)q )( (cid:126)σ × (cid:126)q ) − i ˆ ε ( F + F )2 M S ( (cid:126)σ × (cid:126)σ ) (cid:126)q (cid:21) G F m π (cid:126)q + µ , (2.3)with µ = m ρ , F = g VNN ρ , F = g TNN ρ and where theoperators ˆ α , ˆ β and ˆ ε , defined by:ˆ α = α ρ (cid:126)τ (cid:126)τ , ˆ β = β ρ (cid:126)τ (cid:126)τ , and ˆ ε = ε ρ (cid:126)τ (cid:126)τ , contain the isospin structure in addition to the weak cou-pling constants.The nonrelativistic potential can be obtained from thegeneral expression given in Eq. (2.3) by making the fol-lowing replacements: µ → m ω , F → g VNN ω , F → g TNN ω , ˆ α → α ω , ˆ β → β ω , ˆ ε → ε ω (2.4)in the case of ω -exchange, and µ → m K ∗ , F → g VΛNK ∗ , F → g TΛNK ∗ ˆ α → C PC , VK ∗ D PC , VK ∗ + C PC , VK ∗ (cid:126)τ (cid:126)τ ˆ β → C PC , TK ∗ D PC , TK ∗ + C PC , TK ∗ (cid:126)τ (cid:126)τ ˆ ε → (cid:18) C PVK ∗ D PVK ∗ + C PVK ∗ (cid:126)τ (cid:126)τ (cid:19) (2.5) M Strong c.c. Weak c.c. Λ i PC PV (GeV) π g NN π = 13.16 B π = − A π =1.05 1.750 η g NN η = 6.42 B η = − A η =1.80 1.750K g ΛNK = − C PC K = − C PV K =0.76 1.789 g N Σ K = 5.38 D PC K =8.33 D PV K =2.09 ρ g VNN ρ = 2.97 α ρ = − (cid:15) ρ =1.09 1.232 g TNN ρ = 12.52 β ρ = − ω g V NN ω = 10.36 α ω = − (cid:15) ω = − g T NN ω = 4.195 β ω = − ∗ g V ΛNK ∗ = − C PC , V K ∗ = − C PV K ∗ = − g T ΛNK ∗ = − C PC , T K ∗ = − D PC , V K ∗ = − D PV K ∗ =0.60 D PC , T K ∗ =6.23TABLE I: Nijmegen (NSC97f) meson exchange parametersused in the present work. The weak couplings are in units of G F m π = 2 . × − . for the exchange of a K ∗ -meson. Note that the K ∗ weakvertex has the same structure as the K one, the onlydifference being the parity-conserving contribution whichhas two terms, related to the vector and tensor couplings.Due to the lack of enough phase space to produce thedesired decay vertex, the baryon-baryon-meson couplingsfor mesons heavier than the pion are not available ex-perimentally. To fix such couplings one uses SU(3) fla-vor (SU(6) spin-flavor) symmetry to relate the unknowncouplings involving pseudoscalar (vector) mesons to thepionic decay vertex. For the strong vertices we use thevalues given by the Nijmegen Soft-Core f [17] and theJ¨ulich B [18] models, which also rely on the same sym-metries. This choice generates a model dependency inour approach, which also propagates to the weak cou-plings through the pole model [19] used to evaluate theweak PC baryon-baryon-meson constants. In order to beconsistent, we use the same strong potential models toderive the scattering (T-matrix) NN wave functions inthe final state [20].To regularize the potentials at higher energies we in-clude a form factor at each vertex of the OME dia-gram. The form of this form factor depends on thestrong interaction model we are considering. In the caseof the J¨ulich B model we use a monopole form factor, F ( (cid:126)q ) = (cid:16) Λ i − µ i Λ i + (cid:126)q (cid:17) , at each vertex, while for the NijmegenSC97 models, we use a modified monopole version [20], F ( (cid:126)q ) = (cid:16) Λ i Λ i + (cid:126)q (cid:17) . In both cases, the value of the cut-off,Λ i , depends on the meson exchanged (with mass µ i ). Thefull set of meson-exchange parameters employed here isgiven in Tables I and II. M Strong c.c. Weak c.c. Λ i PC PV (GeV) π g NN π = 13.45 B π = − A π =1.05 1.300 η g NN η = 0 B η =0 A η =1.80 1.300K g ΛNK = − C PC K = − C PV K =0.76 1.200 g N Σ K = 3.55 D PC K =5.50 D PV K =2.09 ρ g VNN ρ = 3.25 α ρ = − (cid:15) ρ =1.09 1.400 g TNN ρ = 19.82 β ρ = − ω g V NN ω = 15.85 α ω = − (cid:15) ω = − g T NN ω = 0 β ω = − ∗ g V ΛNK ∗ = − C PC , V K ∗ = − C PV K ∗ = − g T ΛNK ∗ = − C PC , T K ∗ = − D PC , V K ∗ = − D PV K ∗ =0.60 D PC , T K ∗ =12.18TABLE II: Same as Table I but for the J¨ulich B model.FIG. 2: Lowest order contribution to the weak Λ N → NN diagram. Empty symbols represent weak vertices while solidones represent strong vertices. A circle stands for a contactnon derivative operator and a square for an insertion of aderivative operator. III. THE EFFECTIVE FIELD THEORYAPPROACH
To a given order in the EFT approach, the weak non-leptonic Λ N → N N interaction is built by adding to the π and K exchange mechanisms a series of local terms withincreasing dimension ( i.e. increasing number of deriva-tives) and compatible with chiral symmetry, Lorentz in-variance and the applicable discrete symmetries.Therefore, the leading order (LO) contribution willcontain, apart from the OPE and OKE diagrams, contactoperators with no derivatives acting on the four-baryonvertex. The inclusion of the long ranged π -exchangemechanism is justified by the high value of the momen-tum transfer in the weak reaction, | (cid:126)q | ∼
400 MeV, aconsequence of the difference between the Λ and nucleonmasses in the initial state. The same argument holds forthe explicit inclusion of the K meson, supported also bychiral symmetry. From the diagramatical point of viewthe LO contribution to the potential is given by Fig. 2.One may, equivalently, proceed to chirally expand thevertices entering the Λ N → N N transition, and use aphenomenological approach to account for the strong in-teraction between the baryons involved in the process.Those vertices are nothing else but combinations of the partial wave operator size I a : S → S ˆ1 , (cid:126)σ (cid:126)σ b : S → P ( (cid:126)σ − (cid:126)σ ) (cid:126)q, ( (cid:126)σ × (cid:126)σ ) (cid:126)q q/M N c : S → S ˆ1 , (cid:126)σ (cid:126)σ d : S → P ( (cid:126)σ − (cid:126)σ ) (cid:126)q, ( (cid:126)σ × (cid:126)σ ) (cid:126)q q/M N e : S → P ( (cid:126)σ + (cid:126)σ ) (cid:126)q q/M N f : S → D ( (cid:126)σ × (cid:126)q )( (cid:126)σ × (cid:126)q ) q /M N N → NN transitions for an initial Λ N relative S − wave state. five Dirac bilinear covariants; 1, γ , γ µ , γ µ γ and iσ µν q ν M ;where σ µν = i [ γ µ , γ ν ], M the mass of the baryon and q ν the transferred momentum. Since the relativistic formof these bilinears encodes all the orders in a momentumexpansion, it is their chiral expansion which will betterallow the power counting by comparing non relativisticterms of size 1, p/M, etc. In order to avoid formal incon-sistencies from the chiral point of view, we rely directlyon the terms which enter at each order given the sym-metries fulfilled by the weak | ∆ S | = 1 transition. Allthese possible transitions are shown in Table III for aninitial S − wave Λ − N state, where, the model indepen-dent leading order operators in momentum space respon-sible for the transitions are listed (we are assuming that | (cid:126)p − (cid:126)p | is small enough to disregard higher powers ofthe derivative operators (cid:126)p − (cid:126)p ). Organizing all thesecontributions in increasing size operators, we obtain themost general Lorentz invariant potential, with no deriva-tives in the fields, for the four-fermion (4P) interactionin momentum space up to O ( q /M ) order (in units of G F = 1 . × − MeV − ): V P ( (cid:126)q ) = C + C (cid:126)σ (cid:126)σ (3.1)+ C (cid:126)σ (cid:126)q M + C (cid:126)σ (cid:126)q M + i C ( (cid:126)σ × (cid:126)σ ) (cid:126)q M + C (cid:126)σ (cid:126)q (cid:126)σ (cid:126)q M M + C (cid:126)σ (cid:126)σ (cid:126)q M M + C (cid:126)q M ˜ M , where M is the nucleon mass, M = ( M + M Λ ) / M = (3 M + M Λ ) / M Λ the Λ mass) and C ji is the j th low energy coefficient at i th order. To de-rive the previous expression, we have used the relation( (cid:126)σ × (cid:126)q )( (cid:126)σ × (cid:126)q ) = ( (cid:126)σ (cid:126)σ ) (cid:126)q − ( (cid:126)σ (cid:126)q )( (cid:126)σ (cid:126)q ) . Notice that,in principle, one could write, at next-to-next-to leadingorder, NNLO, another set of eight operators containingthe isospin structure (cid:126)τ · (cid:126)τ . However, once one imposes that the final two-nucleon state must be antisymmetric,the number of structures in the effective potential is re-duced to half the original, leaving to only eight indepen-dent operators.The relation between the LO constants appearing inEq. (3.1) and the ones in the non-antisymmetrized po-tential, V LO (cid:48) P ( (cid:126)q ) = C sc + C vec (cid:126)τ (cid:126)τ + C sc (cid:126)σ (cid:126)σ + C vec (cid:126)σ (cid:126)σ (cid:126)τ (cid:126)τ is the following (see Ref. [28]): C = C sc − C vec − C vec C = C sc − C vec . (3.2)From the former derivation, it is clear that the form ofthe contact terms is model independent. The LEC’s rep-resent the short distance contributions and their size de-pends on how the theory is formulated, and more specif-ically upon the chiral order we are working. The lowenergy parameters which size the relative contribution ofthe contact 4-fermion operators are fitted to the knownweak decay observables discussed in section II. IV. RELATIONS BETWEEN THE OMEPOTENTIALS AND THE EFT
To relate the meson-exchange constants to the LECsin the effective Λ N → N N potential, we perform a low-momentum expansion of the various (regularized) meson-exchange potentials other than the pion and the kaon,since these two are explicitely included in both, the OMEand the EFT approaches. This procedure leads to a seriesof contact terms organized by their increasing dimension, i.e. with increasing powers of momenta, an appropriateform to compare with the EFT potential. Therefore, onecan write these terms up to O ( (cid:126)q /M ) order (in units of G F = 1 . × − MeV − ) as : V LOOME ( (cid:126)q ) = (cid:20) g V ΛN K ∗ m K ∗ (cid:18) C PC,VK ∗ D PC,VK ∗ (cid:19) + g V NN ω α ω m ω + (cid:18) g V ΛN K ∗ C PC,VK ∗ m K ∗ + g V NN ρ α ρ m ρ (cid:19) (cid:126)τ · (cid:126)τ (cid:21) m π , (4.1) V NLOOME ( (cid:126)q ) = − m π M A η g NN η m η (cid:126)σ (cid:126)q − m π M i ( g V ΛN K ∗ + g T ΛN K ∗ ) ( C PVK ∗ + D PVK ∗ ) m π m K ∗ + i( g V NN ω + g T NN ω ) (cid:15) ω m π m ω + (cid:18) i ( g V ΛN K ∗ + g T ΛN K ∗ ) C PVK ∗ m π m K ∗ + i ( g V NN ρ + g T NN ρ ) (cid:15) ρ m π m ρ (cid:19) (cid:126)τ (cid:126)τ (cid:21) ( (cid:126)σ × (cid:126)σ ) (cid:126)q , V NNLOOME ( (cid:126)q ) = m π M M (cid:20)(cid:18) C PC,VK ∗ D PC,VK ∗ + C PC,TK ∗ D PC,TK ∗ (cid:19) g V ΛN K ∗ + g T ΛN K ∗ m K ∗ + ( α ω + β ω ) ( g V NN ω + g T NN ω ) m ω + (cid:32) ( C PC,VK ∗ + C PC,TK ∗ ) ( g V ΛN K ∗ + g T ΛN K ∗ )2 m K ∗ + ( α ρ + β ρ ) (cid:0) g V NN ρ + g T NN ρ (cid:1) m ρ (cid:33) (cid:126)τ (cid:126)τ (cid:35) (cid:0) (cid:126)σ (cid:126)q (cid:126)σ (cid:126)q − (cid:126)σ (cid:126)σ (cid:126)q (cid:1) − m π M M B η g NN η m η (cid:126)σ (cid:126)q (cid:126)σ (cid:126)q − m π g V ΛN K ∗ (cid:0) Λ + m K ∗ (cid:1) (cid:18) C PC,VK ∗ + D PC,VK ∗ (cid:19) m K ∗ Λ + g V NN ω α ω (cid:0) Λ + m ω (cid:1) m ω Λ + (cid:32) g V ΛN K ∗ (cid:0) Λ + m K ∗ (cid:1) C PC,VK ∗ m K ∗ Λ + g V NN ρ α ρ (cid:0) Λ + m ρ (cid:1) m ρ Λ (cid:33) (cid:126)τ (cid:126)τ (cid:35) (cid:126)q . We have chosen to show the explicit expressions of theLECs in terms of meson-exchange parameters in the Ap-pendix B. Here we only quote the relations at LO. Inorder to compare these expressions with the 4P potentialof Eq. (3.1) we need to use the same base of operators.Eq.(3.2) allows us to obtain the LO coefficients in the ˆ1, (cid:126)σ · (cid:126)σ base, C = (cid:20) g V ΛN K ∗ m K ∗ (cid:18) C PC,VK ∗ D PC,VK ∗ (cid:19) + g V NN ω α ω m ω − g V ΛN K ∗ C PC,VK ∗ m K ∗ − g V NN ρ α ρ m ρ (cid:21) m π , (4.2) C = (cid:20) − g V ΛN K ∗ C PC,VK ∗ m K ∗ − g V NN ρ α ρ m ρ (cid:21) m π . (4.3)In Table IV we show the results for the LECs obtainedwithin both formalisms. On the one hand, we quotethe values for the coefficients obtained from Eqs. (4.2)and (4.3) (left column, under the label OME expansion ).The numerical values for the constants in front of thespin-isospin operators have been obtained for each stronginteraction model, and Eq.(3.2) has been used to writethe LECs in the antisymmetric base of operators. Onthe other hand, we show the values obtained from a fit ofour EFT to reproduce the experimental data describedin section II (right column, under the label
LO calcula-tion ). We note that it is enough to consider the LO EFT( i.e. just two constants) to obtain a reasonable fit to thedata. Notice that the values derived from the OME ap-proach do not arise from any fit to the observables butfrom symmetry considerations together with studies ofthe strong baryon-baryon interaction. Their errors areestimated considering an uncertainity in the couplings of ± χ for a fit to 11 observ-ables is also given in the table. In Fig. 3 we show thevalues for the observables used in the present fit togetherwith their respective fitted values, while Fig. 4 shows thecontribution of each point to the χ . FIG. 3: Hypernuclear decay observables (total and partialdecay rates and asymmetry for Λ5 He,
Λ11
B and
Λ12
C), includingtheir error bars and their fitted values. The total decay ratesare in units of the Λ decay rate in free space (Γ Λ = 3 . × s − ). All the quantities are adimensional. The results in Table IV show two important features.First, the LECs derived from the two OME modelsconsidered, J¨ulich and Nijmegen, are compatible albeitmostly due to the large theoretical uncertainties. TheOME prediction for C is in both cases compatible withzero. Secondly, the comparison between the OME ex-tracted LECs values and the LO PC fitted ones showsonly partial agreement. The largest disagreement is seenin C in all cases. In the next section we will discuss howthis disagreement can be reduced with the inclussion ofa scalar exchange in the OME formalism.Note that the results for the LECs presented here aredifferent from the ones given in Ref. [2]. This compar- FIG. 4: Contribution of each experimental point included inthe fit to the total χ for the four different fits discussed inthe text. ison has to be made with the results obtained with theNijmegen NSC97f strong interaction model, which is theonly one used in [2]. Apart from small (kinematical)changes in the final NN wave functions, and in the reg-ularization of the OKE mechanism, the main differencebetween both calculations resides in the experimental val-ues used to perform the fit. We have updated our dataset in order to include the recent rates extracted fromthe measure in coincidence of the two nucleons in thefinal state. Moreover, values of the n/p ratio close toone have been disregarded, following the last experimen-tal and theoretical analysis, and more accurate data withsmaller error bars have been included. Nijmegen J¨ulichOME expansion LO PC calculation OME expansion LO PC calculation C . ± .
88 ( − . ± .
31) (4 . ± . − . ± . . ± .
50) (0 . ± . C . ± .
36 ( − . ± .
11) (0 . ± .
33) 0 . ± .
37 ( − . ± .
28) ( − . ± . χ .
89 13 .
43 4 .
26 4 . G F = 1 . × − MeV − . V. SCALAR EXCHANGE INTERACTION
By inspecting Table IV one clearly sees that the largestdiscrepancy affects the C coefficient. This could be anindication of the relevance of a scalar exchange ( σ ) whichis not explicitly included in the meson exchange formal-ism employed. A sensible way of inferring qualitativelythe physical properties of such scalar would be to addit to the meson exchange description. The one scalar-exchange (OSE) contribution can be obtained from thefollowing weak and strong vertices [4]: H S NN σ = i g NN σ ψ N φ σ ψ N , H W ΛN σ = i G F m π ψ N ( A σ + B σ γ ) φ σ ψ Λ (cid:0) (cid:1) , (5.1) where A σ and B σ parametrize the parity conserving andparity violating weak amplitudes. In the non-relativisticapproximation, the corresponding potential reads, V OSE ( (cid:126)q ) = − G F m π g NNσ (cid:18) A σ + B σ M W (cid:126)σ (cid:126)q (cid:19) . (5.2)We can now try to establish the values of the weakcouplings A σ and B σ by direct comparison to the resultsof the fits. We can obtain information about A σ usingthe numbers obtained in our LO (parity conserving) fit.Insight on B σ would require a NLO fit, which, as wealready mentioned, is not needed to get a reasonable fitto our observables.The OSE gives contribution, in particular, to C ,which now becomes: C σ )0 = (cid:20) g V ΛN K ∗ m K ∗ (cid:18) C PC,VK ∗ D PC,VK ∗ (cid:19) + g V NN ω α ω m ω (5.3) − g V ΛN K ∗ C PC,VK ∗ m K ∗ − g V NN ρ α ρ m ρ − A σ g NNσ m σ (cid:21) m π . Since C is not modified by the inclusion of the σ , theminima that may be improved via this mechanism are theones in which this coefficient is already in agreement withthe one obtained from the OME expansion. Focusing onthese minima (the ones with χ = 13 .
43 and χ = 4 . A σ needed to make the twoformalisms agree (at LO) within each strong interactionmodel. Using m σ = 550 MeV and g NNσ = 8 . A σ in the range 3 . → . . →
16 for the J¨ulich one.The shaded blue band in Fig. 5 (6) shows the valueof C σ )0 given by Eq. (5.3) as a function of A σ , whenthe Nijmegen (J¨ulich) strong interaction model is used.Note that the error band in C σ )0 is given by the prop-agation of the uncertainties in the baryon-baryon-mesoncoupling constants, taken to be of the order of 30%. Inthe same plot we represent the corresponding fitted valuein the EFT approach (solid orange band). The range for A σ quoted before corresponds to the intersection of bothbands in the plot, i.e , the values for A σ that make com-patible the OME and EFT formalisms. FIG. 5: Comparison between C and C σ )0 for the Nijmegenminimum. The shaded blue area represents the dependenceof C σ )0 on A σ given by Eq. (5.3), while the fitted EFT C value is respresented by the solid orange area. See text fordetails. Other works have fitted this same parameter using dif-ferent approaches. For instance, Ref. [4], which incor-porates the OPE, OKE and OSE mechanisms together
FIG. 6: Same as Fig. 5 but for the J¨ulich minimum. with a direct-quark transition, uses the phenomenolog-ical approach of Block and Dalitz [5] to write the non-mesonic decay rates in terms of the squares of the am-plitudes given in Table III for the s-shell He, He and H hypernuclei. This factorization in terms of two-bodyamplitudes is possible when effective (spin-independent)correlations are used to account for the strong interactionamong baryons, where no mixing between the differentpartial waves is possible. The strong interaction modelused in this work is NSC97f. This approach leads to aquadratic equation to determine the couplings, resultingin two values for A σ , 3 . − . σ meson,while again, effective (spin independent) correlations areused in the strong sector. Fixing the value of the strong N N σ coupling to be the same as the πN N one, a range ofvariation for the σ mass and cut-off leads to different val-ues for the weak couplings, once a fit to the nonmesonicdecay rate and the neutron-to-proton ratio for He isperformed. Even though the inclusion of the σ exchangemechanism does modify their prediction for the intrinsicasymmetry, their results are insensitive to the particularvalues of the A σ and B σ couplings, and a simultaneousreproduction of all the data is not achieved. VI. CONCLUSIONS AND SUMMARY
We have derived the relations between the low energycoefficients appearing in the EFT description of the two-body Λ N → N N transition driving the decay of hyper-nuclei and the parameters appearing in the widely usedmeson-exchange model. This has been achieved by com-paring the momentum space expansion of the OME po-tentials to the different orders in the EFT formalism.In both approaches, the one-pion- and one-kaon-exchange mechanisms are explicitly included to accountfor the long and intermediate ranges of the interaction.The higher mass contributions ( η , ρ , ω and K ∗ ) in theOME model are parametrized as contact four-point in-teractions in the EFT approach. With this procedure weobtain relations for the LECs in terms of the masses, cou-plings and cut-offs characteristic of the OME formalism.The numerical values for the LO EFT LECs have beenobtained by fitting the available experimental data forhypernuclear decay observables. In the OME case, how-ever, the LECs have been written in terms of the masses,couplings and cut-offs, taken from their experimental val-ues, symmetry constraints or strong interaction models.The considered experimental database of hypernucleardecay observables can be described with good accuracywithin a LO EFT supplemented by π and K meson ex-changes. This implies that further experimental effortswill be needed to constrain the higher order terms in theEFT of hypernuclear decay.Finally, we have analyzed the contribution of a scalarexchange in OME models, estimating the size of thecorresponding parity conserving amplitude, needed toachieve a better agreement to the available experimen-tal data. Acknowledgments
We thank Angels Ramos and Joan Soto for a carefulreading of the manuscript.This work was partly supported by the contractFIS2008-01661 from MEC (Spain) and FEDER, theEU contract FLAVIAnet MRTN-CT-2006-035482, bythe contract MIUR 2001024324 007, by the contract2005SGR-00343 from the Generalitat de Catalunya andby the European Community Research Infrastructure In-tegrating Activity “Study of Strongly Interacting Mat-ter” (acronym Hadron- Physics2, Grant Agreement n.227431) under the 7th Framework Programme of the EU.A. P´erez-Obiol acknowledges the APIF PhD scholarshipprogram of the University of Barcelona.
Appendix A: Meson-exchange potentials
The weak and strong vertices entering the one-pion-exchange (OPE) amplitude are: H WΛN π = i G F m π ψ N ( A π + B π γ ) (cid:126)τ (cid:126)φ π ψ Λ (cid:0) (cid:1) , H SNN π = i g NN π ψ N γ (cid:126)τ (cid:126)φ π ψ N , (A1)where G F m π = 2 . × − is the weak coupling con-stant, and A π and B π , empirical constants adjusted to the observables of the free Λ decay, which determinethe strength of the parity-violating and parity-conservingamplitudes, respectively. The nucleon, lambda and pionfields are given by ψ N , ψ Λ and (cid:126)φ π , respectively, whilethe isospin spurion (cid:0) (cid:1) is included to enforce the empiri-cal ∆ T = 1 / γ [24]is taken.For the exchange of the pseudoscalar η and K mesons,the strong and weak vertices are (weak constants aregiven in units of G F m π ) : H S NN η = i g NN η ψ N γ φ η ψ N , H W ΛN η = i ψ N ( A η + B η γ ) φ η ψ Λ (cid:0) (cid:1) , H S ΛN K = i g ΛN K ψ N γ φ K ψ Λ , H W NN K = i (cid:2) ψ N (cid:0) (cid:1) ( C PVK + C PCK γ ) ( φ K ) † ψ N (A2)+ ψ N ψ N ( D PVK + D PCK γ ) ( φ K ) † (cid:0) (cid:1)(cid:3) , where the weak coupling constants cannot be taken di-rectly from experiment.The weak ΛN ρ , ΛN ω , NN K ∗ and strong NN ρ , NN ω ,ΛN K ∗ vertices are given by [27]: H W ΛN ρ = ψ N (cid:18) α ρ γ µ (A3) − β ρ i σ µν q ν M + ε ρ γ µ γ (cid:19) (cid:126)τ (cid:126)ρ µ ψ Λ (cid:0) (cid:1) , H S NN ρ = ψ N (cid:18) g VNN ρ γ µ + i g TNN ρ M σ µν q ν (cid:19) (cid:126)τ (cid:126)ρ µ ψ N , (A4) H S NN ω = ψ N (cid:18) g VNN ω γ µ + i g TNN ω M σ µν q ν (cid:19) φ ωµ ψ N (A5) H W ΛN ω = ψ N (cid:18) α ω γ µ (A6) − β ω i σ µν q ν M + ε ω γ µ γ (cid:19) φ ωµ ψ Λ (cid:0) (cid:1) , H S ΛNK ∗ = ψ N (cid:18) g VΛNK ∗ γ µ + i g TΛNK ∗ M σ µν q ν (cid:19) φ K ∗ µ ψ Λ , (A7) H W NNK ∗ = (cid:0) C PC , VK ∗ ψ N (cid:0) (cid:1) ( φ K ∗ µ ) † γ µ ψ N + D PC , VK ∗ ψ N γ µ ψ N ( φ K ∗ µ ) † (cid:0) (cid:1) + C PC , TK ∗ ψ N (cid:0) (cid:1) ( φ K ∗ µ ) † ( − i) σ µν q ν M ψ N + D PC , TK ∗ ψ N ( − i) σ µν q ν M ψ N ( φ K ∗ µ ) † (cid:0) (cid:1) + C PVK ∗ ψ N (cid:0) (cid:1) ( φ K ∗ µ ) † γ µ γ ψ N + D PVK ∗ ψ N γ µ γ ψ N ( φ K ∗ µ ) † (cid:0) (cid:1) (cid:1) . (A8) Appendix B: LECs in terms of meson-exchangeparameters
The expressions for the LECs in terms of the mesonexchange parameters are the following: C sc = (cid:20) g V ΛN K ∗ m K ∗ (cid:18) C PC,VK ∗ D PC,VK ∗ (cid:19) + g V NN ω α ω m ω (cid:21) m π ,C vec = (cid:18) g V ΛN K ∗ C PC,VK ∗ m K ∗ + g V NN ρ α ρ m ρ (cid:19) m π , C sc = 0 ,C vec = 0 ,C sc = 0 ,C vec = 0 ,C sc = − m π M A η g NN η m η ,C vec = 0 , (B1) C sc = − m π M i ( g V ΛN K ∗ + g T ΛN K ∗ ) ( C PVK ∗ + D PVK ∗ ) m π m K ∗ + i( g V NN ω + g T NN ω ) (cid:15) ω m π m ω ,C vec = m π M (cid:20) i ( g V ΛN K ∗ + g T ΛN K ∗ ) C PVK ∗ m π m K ∗ + i ( g V NN ρ + g T NN ρ ) (cid:15) ρ m π m ρ (cid:21) ,C sc = m π M M (cid:20)(cid:18) C PC,VK ∗ D PC,VK ∗ + C PC,TK ∗ D PC,TK ∗ (cid:19) g V ΛN K ∗ + g T ΛN K ∗ m K ∗ + ( α ω + β ω ) ( g V NN ω + g T NN ω ) m ω − B η g NN η m η (cid:21) ,C vec = m π M M (cid:34) ( C PC,VK ∗ + C PC,TK ∗ ) ( g V ΛN K ∗ + g T ΛN K ∗ )2 m K ∗ + ( α ρ + β ρ ) (cid:0) g V NN ρ + g T NN ρ (cid:1) m ρ (cid:35) ,C sc = − m π M M (cid:20)(cid:18) C PC,VK ∗ D PC,VK ∗ + C PC,TK ∗ D PC,TK ∗ (cid:19) g V ΛN K ∗ + g T ΛN K ∗ m K ∗ + ( α ω + β ω ) ( g V NN ω + g T NN ω ) m ω (cid:21) ,C vec = − m π M M (cid:34) ( C PC,VK ∗ + C PC,TK ∗ ) ( g V ΛN K ∗ + g T ΛN K ∗ )2 m K ∗ + ( α ρ + β ρ ) (cid:0) g V NN ρ + g T NN ρ (cid:1) m ρ (cid:35) ,C sc = − m π g V ΛN K ∗ (cid:0) Λ + m K ∗ (cid:1) (cid:18) C PC,VK ∗ + D PC,VK ∗ (cid:19) m K ∗ Λ + g V NN ω α ω (cid:0) Λ + m ω (cid:1) m ω Λ , (B2) C vec = − m π (cid:34) g V ΛN K ∗ (cid:0) Λ + m K ∗ (cid:1) C PC,VK ∗ m K ∗ Λ + g V NN ρ α ρ (cid:0) Λ + m ρ (cid:1) m ρ Λ (cid:35) . [1] Jung-Hwan Jun, Phys. Rev. C , 044012 (2001).[2] A. Parre˜no, C. Bennhold, and B.R. Holstein, Phys. Rev.C , 051601 (2004); A. Parre˜no, C. Bennhold, and B.R.Holstein, Nucl. Phys. A , 127c (2005).[3] G. Ecker, J. Kambor, and D. Wyler, Nucl. Phys. B ,101 (1993).[4] K. Sasaki, M. Izaki, and M. Oka, Phys. Rev. C , 035502(2005).[5] M.M. Block and R.H. Dalitz, Phys. Rev. Lett. , 96(1963).[6] C. Barbero and A. Mariano, Phys. Rev. C , 024309(2006).[7] C. Chumillas, G. Garbarino, A. Parre˜no, and A. Ramos,Phys. Lett. B , 180-186 (2007).[8] K. Itonaga, T. Ueda, and T. Motoba, Nucl. Phys. A , 331c (1995).[9] E. Oset, D. Jido, and J.E. Palomar, Nucl. Phys. A ,146 (2001).[10] C. Barbero and A. Mariano, Phys. Rev. C , 024309(2006).[11] H. Outa et al., Nucl. Phys. A , 157c (2005).[12] B.H. Kang et al., Phys. Rev. Lett. , 062301 (2006).[13] M.J. Kim et al., Phys. Lett. B , 28 (2006).[14] G. Garbarino, A. Parre˜no, and A. Ramos, Phys. Rev.Lett. , 112501 (2003).[15] G. Garbarino, A. Parre˜no, and A. Ramos, Phys. Rev.C , 054603 (2004).[16] A. Parre˜no, A. Ramos, and C. Bennhold, Phys. Rev.C , 339 (1997).[17] V.G.J. Stoks and Th.A. Rijken, Phys. Rev. C , 3009 (1999); Th.A. Rijken, V.G.J. Stoks, and Y. Yamamoto,Phys. Rev. C , 21-40 (1999).[18] B. Holzenkamp, K. Holinde, and J. Speth, Nucl. Phys.A , 485 (1989).[19] J.F. Dubach, G.B. Feldman, B.R. Holstein, and L. de laTorre, Ann. Phys. (N.Y.) , 146 (1996).[20] A. Parre˜no and A. Ramos, Phys. Rev. C , 015204(2002).[21] S. Weinberg, Phys. Lett. B B , 1-8 (1998). [24] J.D. Bjorken and S.D. Drell, Relativistic Quantum Me-chanics (McGraw-Hill, New York, 1964).[25] N. Kaiser, R. Brockmann, and W. Weise, Phys. Rev.A , 758 (1997)[26] E. Epelbaum, U. Meissner, W. Gl¨ockle, and C. Elster,Phys. Rev. C , 04401 (2002)[27] B.H.J. McKellar and B.F. Gibson, Phys. Rev. C , 322(1984).[28] E. Epelbaum, Ph.D. thesis, Ruhr-Universitat, Bochum,2000.[29] R. Machleidt, Adv. Nucl. Phys.19