Particle Motion Around Tachyon Monopole
aa r X i v : . [ g r- q c ] J un Particle Motion Around Tachyon Monopole
M.Kalam ‡ , F.Rahaman ∗ and S.Mondal ∗ Abstract
Recently, Li and Liu have studied global monoole of tachyon in a four dimen-sional static space-time. We analyze the motion of massless and massive particlesaround tachyon monopole. Interestingly, for the bending of light rays due to tachyonmonopole instead of getting angle of deficit we find angle of surplus. Also we findthat the tachyon monopole exerts an attractive gravitational force towards matter.
1. Introduction:
At the early stages of its evolution, the Universe has underwent a number of phase tran-sitions. During the phase transitions, the symmetry has been broken. According tothe Quantum field theory, these types of symmetry-breaking phase transitions producestopological defects [1]. These are namely domain walls, cosmic strings, monopoles andtextures. Monopoles are point like defects that may arise during phase transitions in theearly universe. In particular , π ( M ) = I ( M is the vacuum manifold ) i.e. M containssurfaces which can not be continuously shrunk to a point, then monopoles are formed [2].A typical symmetry - breaking model is described by the Lagrangian, L = 12 ∂ µ Φ a ∂ µ Φ a − V ( f ) (1)Where Φ a is a set of scalar fields, a = 1 , , .., N, f = √ Φ a Φ a and V ( f ) has a minimumat a non zero value of f . The model has 0( N ) symmetry and admits domain wall, stringand monopole solutions for N = 1 , Pacs Nos: 04.20 Gz, 04.50 + h, 04.20 JbKey words: Tachyon Monopole, Geodesic, Test Particle ∗ Dept.of Mathematics, Jadavpur University, Kolkata-700 032, India: E-Mail:farook [email protected] ‡ Dept. of Phys., Netaji Nagar College for Women, Regent Estate, Kolkata-700092, India:E-Mail:[email protected] V ( f ) is maximum at f = 0 and it decreases monotonically to zero for f → ∞ without having any minima. For example, V ( f ) = λM n ( M n + f n ) − where M, λ and n are positive constants. This type of potential can arise in non-perturbative superstring models. Defects arising in these models are termed as ” vac-uumless defects ”. Recently, several authors have studied vacuumless topological defectsin alternative theory of gravity [5].Barriola and Vilenkin [6] were the pioneer who studied the gravitational effects of globalmonopole. It was shown by considering only gravity that the linearly divergent mass ofglobal monopole has an effect analogous to that of a deficit solid angle plus that of a tinymass at the origin [6]. Later it was studied by Harari and Loust`o [7], and Shi and Li [8]that this small gravitational potential is actually repulsive. Recently, Sen [9] showed instring theories that classical decay of unstable D-brane produces pressureless gas whichhas non-zero energy density. The basic idea is that though the usual open string vacuumis unstable, there exists a stable vacuum with zero energy density.This state is associatedwith the condensation of electric flux tubes of closed string [10]. By using an effectiveBorn-Infeld action, these flux tubes could be explained [11]. Sen also proposed the tachyonrolling towards its minimum at infinity as a dark matter candidate [10]. Sen have alsoanalyzed the Dirac-Born-Infeld Action on the Tachyon Kink and Vortex[12]. Gibbonsactually initiated the study of tachyon cosmology. He took the coupling into gravitationalfield by adding an Einstein-Hilbert term to the effective action of the tachyon on a brane[13]. In the cosmological background, several scientists have studied the process of rollingof the tachyon [14, 15].Different kinds of cold stars such as Q-stars have been proposed to be a candidate for thecold dark matter [16-25]. A new class of cold stars named as D-stars(defect stars) havebeen proposed by Li et.al.[26]. Compared to Q-stars, the D-stars have a peculiar phenom-ena, that is, in the absence of the matter field the theory has monopole solutions, whichmakes the D-stars behave very differently from the Q-stars. Moreover, if the universedoes not inflate and the tachyon field T rolls down from the maximum of its potential,the quantum fluctuations produced various topological defects during spontaneous sym-metry breaking. That is why it is so crucial to investigate the property and the gravityof the topological defects of tachyon, such as Vortex [27], Kink [28] and monopole, inthe static space time. Recently, Li and Liu [29] have studied gravitational field of globalmonopole of tachyon.In this paper, we will discuss the behavior of the motion of massless and massive particlesaround Tachyon Monopole. We will calculate the amount of deficit angle for the bendingof light rays. Also we will investigate the nature of gravitational field of tachyon monopoletowards matters by using Hamilton-Jacobi method.2 . Tachyon Monopole Revisited: Let us consider, a general static, spherically-symmetric metric as ds = A ( r ) dt − B ( r ) dr − r ( dθ + sin θdφ ) (2)The Lagrangian density of rolling tachyon can be written in Born-Infeld form as L = L R + L T = √− g (cid:20) R κ − V ( | T | ) p − g µν ∂ µ T a ∂ ν T a (cid:21) where T a is a triplet of tachyon fields, a = 1 , , g µν is the metric coefficients. Onecan consider the monopole as associated with a triplet of scalar field as T a = f ( r ) x a r where x a x a = r . Now using the Lagrangian density, L, the metric and the scalar field,the Einstein equations take the following forms as1 r − B (cid:18) r + B ′ rB (cid:19) = κT r − B (cid:18) r + A ′ rA (cid:19) = κT where the prime denotes the derivative with respect to r and energy momentum tensor T µν are given by T = V ( f ) r f ′ B + 2 f r T = V ( f )(1 + f r ) q f ′ B + f r T = T = V ( f )(1 + f ′ B + f r ) q f ′ B + f r and the rest are zero. So, the system depends on the tachyon potential V ( T ). According toSen [9], the potential should have an unstable maximum at T = 0 and decay exponentiallyto zero when T → ∞ . 3ne can choose the tachyon potential which satifies the above two conditions as follows: V ( f ) = M (cid:0) λf (cid:1) exp ( − λf )where M and λ are positive constants.In flat space-time, the Euler-Lagrange equation will take the following form:1 V (cid:18) dVdf (cid:19) + 2 fr = f ′′ + 2 f ′ r − f ′ " f ′ f ′′ + fr (cid:0) f ′ − fr (cid:1) f ′ + f r and the energy density of the system can be written as T = V ( f ) r f ′ + 2 f r For the above mentioned tachyon potential, V ( f ) the Euler-Lagrange equation has asimple exact solution f ( r ) = λ − (cid:18) δr (cid:19) where δ = λ − is the size of the monopole core and corresponding energy density becomes T = M " (cid:18) δr (cid:19) exp " − (cid:18) δr (cid:19) Considering the Newtonian approximation, the Newtonian potential can be written as ∇ Φ = κ T − T ii )At r ≫ δ , T − T ii ≃ − M . Therefore, the solution of the above equation isΦ( r ) ≃ − πM λM p f where M p is the Planck mass and the parameter M should satisfies the condition M ≤ − eV in order to avoid conflicting present cosmological observations. The linearizedapproximation applies for | Φ( r ) | ≪
1, which is equivalent to f ≫ q π λ M M p .Now, one can express the metric coefficients A(r) and B(r) as A ( r ) = 1 + α ( r ) , B ( r ) = 1 + β ( r ) . α ( r ) and β ( r ), and using the flat space expression for f ( r ), the Einsteinequations becomes α ′ r + β ′ r = κM (cid:18) δr (cid:19) " (cid:18) δr (cid:19) − exp " − (cid:18) δr (cid:19) and α ′′ + 2 α ′ r = − κM " (cid:18) δr (cid:19) (cid:18) δr (cid:19) − exp " − (cid:18) δr (cid:19) After solving one can write the solution of the external metric as A ( r ) = (cid:18) − κM r (cid:19) ; B ( r ) = (cid:18) κM r − κM λr (cid:19) (3)
3. The Geodesics:
Let us now write down the equation for the geodesics in the metric (2) . From d x µ dτ + Γ µνλ dx ν dτ dx λ dτ = 0 (4)we have B ( r ) (cid:18) drdτ (cid:19) = E A ( r ) − J r − L (5) r (cid:18) dφdτ (cid:19) = J (6) dtdτ = EA ( r ) (7)where the motion is considered in the θ = π plane and constants E and J are identified asthe energy per unit mass and angular momentum, respectively , about an axis perpendic-ular to the invariant plane θ = π . Here τ is the affine parameter and L is the Lagrangianhaving values 0 and 1, respectively, for massless and massive particles.The equation for radial geodesic ( J = 0):˙ r ≡ (cid:18) drdτ (cid:19) = E A ( r ) B ( r ) − LB ( r ) (8)Using equation(7) we get (cid:18) drdt (cid:19) = A ( r ) B ( r ) − A ( r ) LE B ( r ) (9)5rom equation(3), we can write (cid:18) drdt (cid:19) = (cid:18) − κM r (cid:19) (cid:18) κM r − κM λr (cid:19) − − LE (cid:18) κM r − κM λr (cid:19) − (cid:18) − κM r (cid:19) (10)Expanding the expression binomially and neglecting the higher order of κM ( as κM isvery small ) we get (cid:18) drdt (cid:19) = (cid:18) − κM r + κM λr (cid:19) − LE (cid:18) − κM r + κM λr (cid:19) (11) In this case, (cid:18) drdt (cid:19) = (cid:18) − κM r + κM λr (cid:19) (12)After integrating, we get ± t = Z rdr q(cid:0) r − κM r + κM λ (cid:1) (13)This gives the t − r relationship as ± t = − q κM sin − − κM r q κ M λ (14)The t − r relationship is depicted in Fig. 1. Time - Distance Relationship 4014240144401464014840150 T i m e Figure 1: t − r relationship for massless particle( choosing κM = 573 . × − , λ = 1 )Again, from equation (8) we get˙ r ≡ (cid:18) drdτ (cid:19) = E A ( r ) B ( r ) (15)6fter integrating, we get ± Eτ = Z s(cid:18) − κM r (cid:19) (cid:18) κM r − κM λr (cid:19) dr (16)This gives the τ − r relationship as ± Eτ = (cid:18) r + κM λr (cid:19) (17)( neglecting the higher order of κM ).We show graphically (see Fig. 2 ) the variation of proper-time ( τ ) with respect to radialco-ordinates (r) . Proper time - Distance Relationship 05101520 P r ope r t i m e Figure 2: τ − r relationship for massless particle ( choosing κM = 573 . × − , λ = 1 , E = 0 . In this case, (cid:18) drdt (cid:19) = (cid:18) − κM r + κM λr (cid:19) − E (cid:18) − κM r + κM λr (cid:19) (18)After integrating, we get ± t = Z Erdr q(cid:0) κM − κM E (cid:1) r + ( E − r + κM λ ( E −
1) (19)This gives the t − r relationship as (see graphical Fig. (3)) ± t = E/ q κM ( − E ) ln[2 q(cid:0) κM (cid:0) − E (cid:1)(cid:1) (cid:0) κM (cid:0) − E (cid:1) r (cid:1) + ( E − r + κM λ ( E − κM (cid:0) − E (cid:1) r + ( E − Time - Distance Relationship 020000400006000080000 T i m e Figure 3: t − r relationship for massive particle( choosing κM = 573 . × − , λ =1 , E = 0 . r ≡ (cid:18) drdτ (cid:19) = E A ( r ) B ( r ) − B ( r )Neglecting the higher order of κM , we get ± Z dτ = Z (cid:16) − κM λr (cid:17) dr q E − κM r This gives the τ − r relationship as ± τ = r κM cosh − r q − E ) κM − ( κM ) / √ λ (1 − E ) q r − − E ) κM r We show graphically (see Fig. 4 ) the variation of proper-time ( τ ) with respect to radialco-ordinates (r) . 8 P r ope r t i m e Figure 4: τ − r relationship for massive particle ( choosing κM = 573 . × − , λ = 1 , E = 0 .
4. Bending of Light rays:
For photons ( L=0 ), the trajectory equations (5) and (6) yield (cid:18) dUdφ (cid:19) = a A ( r ) B ( r ) − U B ( r ) (20)where U = r and a = E J .Equation (20) and (3) gives φ = Z ± dU q(cid:0) a + κM (cid:1) − (cid:0) − a κM λ (cid:1) U (21)( neglecting the higher order of κM and the product of κM × U terms ).This gives φ = 1 q(cid:0) − a κM λ (cid:1) cos − UA (22)where A = a + κM − a κM λ .For U →
0, one gets 2 φ = π (cid:18) a κM λ (cid:19) (23)and bending comes out as∆ φ = π − φ = π − π (cid:18) a κM λ (cid:19) = − a κM λ π (24)which is nothing but angle of surplus[30]. 9 Figure 5: We Plot U vs. φ ( choosing κM = 573 . × − , λ = 1 , a = 0 . –10–8–6–4–20 D e f l e c t i on Figure 6: We plot Deflection vs. Mass ( choosing κ = 25 . λ = 1 , a = 0 . –4e–06–3e–06–2e–06–1e–060 D e f l e c t i on
20 40 60 80 100E/J
Figure 7: We plot Deflection vs. E/J ( choosing κM = 573 . × − , λ = 1 )10 . Motion of test particle: Let us consider a test particle having mass m moving in the gravitational field of thetachyon monopole described by the metric ansatz(2). So the Hamilton-Jacobi [ H-J ]equation for the test particle is [31] g ik ∂S∂x i ∂S∂x k + m = 0 (25)where g ik are the classical background field (2) and S is the standard Hamilton’s charac-teristic function .For the metric (2) the explicit form of H-J equation (25) is [31]1 A ( r ) (cid:18) ∂S∂t (cid:19) − B ( r ) (cid:18) ∂S∂r (cid:19) − r (cid:18) ∂S∂θ (cid:19) − r sin θ (cid:18) ∂S∂ϕ (cid:19) + m = 0 (26)where A ( r ) and B ( r ) are given in equation (3) .In order to solve this partial differential equation, let us choose the H − J function S as[32] S = − E.t + S ( r ) + S ( θ ) + J.ϕ (27)where E is identified as the energy of the particle and J is the momentum of the particle.The radial velocity of the particle is ( for detailed calculations, see ref. [32] ) drdt = A ( r ) E p B ( r ) s E A ( r ) + m − p r (28)where p is the separation constant.The turning points of the trajectory are given by (cid:0) drdt (cid:1) = 0 and as a consequence thepotential curve are Em = s A ( r ) (cid:18) p m r − (cid:19) ≡ V ( r ) (29)In a stationary system, E i.e. V ( r ) must have an extremal value. Hence the value of r for which energy attains it extremal value is given by the equation dVdr = 0 (30)11ence we get 2 κM r = 2 p m ⇒ r = (cid:18) p κM m (cid:19) (31)So this equation has at least one positive real root. Therefore, it is possible to have boundorbit for the test particle i.e. the test particle can be trapped by the tachyon monopole.In other words, the tachyon monopole exerts an attractive gravitational force towardsmatter.
6. Concluding remarks:
In this paper, we have investigated the behavior of a massless and massive particles inthe gravitational field of a tachyon monopole. The tachyon monopole, in compare to theordinary monopole, are very diffuse objects whose energy distributed at large distancesfrom the monopole core, their space-time is vastly different from the ordinary monopole.The figures (1) and (2) indicate that the nature of ordinary time and proper time forthe massless particle in the gravitational field of tachyonic monopole is opposite to eachother. Here, one can see that ordinary time decreases with increase of radial distancewhere as the proper time increases with increase of radial distance. Figures (3) and(4) show that in case of massive particle, the ordinary time and proper time have thesame nature. According to Li and Liu [29], tachyon monopole has a small gravitationalpotential of repulsive nature, corresponding to a negative mass at origin. In the analysisof the bending of light rays, we get angle of surplus instead of angle of deficit. So, we mayconclude that it has a property of short range repulsive force. From eqn.(31), we see that r = M (cid:16) p κm (cid:17) i.e. r would be very large as M is very small, in other words, particle canbe trapped at a large distance from the monopole core. This implies tachyon monopolewould have effect on particles far away from its core. That means tachyon monopole hasa long range gravitational field which is sharply contrast to ordinary monopole. Acknowledgments
F.R. is thankful to DST , Government of India for providing financial support. MK hasbeen partially supported by UGC, Government of India under MRP scheme.