Accelerating bianchi type dark energy cosmological model with cosmic string in f(T) Gravity
AAccelerating bianchi type dark energy cosmological model with cosmic string in f ( T ) Gravity
S. H. Shekh ∗ , V. R. Chirde † , Department of Mathematics, S.P.M. Science and Gilani Arts and Commerce College,Ghatanji, Yavatmal, Maharashtra-445301, India. and Department of Mathematics, G.S.G. Mahavidyalaya, Umarkhed-445206, India.
Abstract:
In this paper, we have investigated some features of anisotropic accelerating Bianchitype-I cosmological model in the presence of two non-interacting fluids, i.e. one usual string andother dark energy fluid towards the gravitational field equations for the linear form of f ( T ) gravity,where T be the torsion. To achieve a physically realistic solution of the field equations, we haveconsidered an exact matter dominated volumetric power law expansion. The aspects of derivedmodel are discussed with the help of solution and make the model at late times turn out to beflat Universe. Also, observed that the model has initially non-singular and stable while for wholeexpansion it is unstable. At an initial expansion 0 . ≤ t ≤ .
05 when the Universe start to expandto infinite expansion t > .
73 (break away from for small interval of cosmic time 0 . ≤ t ≤ . . ≤ t ≤ .
73 it approaches the quintessence region.Also, the string exists in the early universe which is in agreement with constraints of CMBR databut with the expansion the string phase of the Universe disappears, i.e. we have an anisotropic fluidof particles.
PACS numbers: 95.36.+x; 98.80.Cq; 04.50.Kd.
Keywords : Bianchi type s pace-time; dark energy; cosmic string; modified gravity. I. INTRODUCTION
The Cosmic Microwave Background radiation as seen in data from satellites such as the Wilkinson MicrowaveAnisotropy Probe (Knop et al. et al. ω = p/ρ , where ω is not necessarily constant. The ω lies close to −
1: it would be equal to (standardcosmology), a little bit upper than − − ω << − et al. (2014b) investigated magnetized dark energy cosmological models with time dependentcosmological term in Lyra geometry. Mahanta et al. (2014) constructed dark energy anisotropic Bianchi type-IIIcosmological models with a variable equation of state parameter in Barber’s second self-creation theory of gravitationusing the special law of variation of Hubble’s parameter that yields a constant value of the deceleration parameterand obtained two different models in which first model the value of equation of state parameter is in good agreementwith the recent observations of type Ia supernovae data with cosmic microwave background radiation anisotropy andgalaxy clustering statistics. Recently Aditya et al. (2019) investigated the dark energy phenomenon by studyingthe Tsallis holographic dark energy within the framework of Brans Dicke scalar–tensor theory of gravity where the ∗ Email: da salim@rediff.com † Email: vrchirde333@rediffmail.com a r X i v : . [ phy s i c s . g e n - ph ] M a r Brans and Dicke scalar field is a logarithmic function of the average scale factor and Hubble horizon as the IR cutoffand very recently Singh et al. (2020) examined dark energy cosmological model in modified scale covariant theoryof gravitation. The dynamical dark energy models are classified into two different categories: (i) the scalar fieldsincluding Quintessence, Phantom, Quintom, K-essence, Tachyon, Dilaton, and so forth; (ii) the interacting models ofdark energy such as the Chaplygin gas models (Sarkar 2014), Agegraphic (Wei & Cai 2008) and Holographic (Thomas2002; Setare 2007) models. In recent years, an interesting observation is made to determine the nature of dark energyin quantum gravity which is termed as holographic dark energy using principle of holographic dark energy. Thisprinciple (the degrees of freedom in a bounded system should be finite and does not scale by it volume but withits boundary era) was first put forwarded by Hooft (1993) in the context of black hole physics. Latter on Fischler& Susskind (1998) have proposed a new version of the holographic principle, viz. at any time during cosmologicalevolution, the gravitational entropy within a closed surface should not be always larger than the particle entropythat passes through the past light-cone of that surface. In the context of the dark energy problem, though theholographic principle proposes a relation between the holographic dark energy density ρ Λ and the Hubble parameter H as ρ Λ = H , it does not contribute to the present accelerated expansion of the universe along with Granda &Olivers (2008) proposed a holographic density of the form ρ Λ ∼ = αH + βH , where α , β are constants which mustsatisfy the restrictions imposed by the current observational data.There are various modified gravity, One replaces the Ricci scalar R in the Einstein-Hilbert action by an arbitraryfunction of R belongs to the well-known f ( R ) modified gravity (Azadi et al. 2008; Sharif & Yousaf 2014; Chirde& Shekh 2016a; 2017). Another one that has gained much regard in the last few years is Gauss-Bonnet gravitysay f ( G ) theory of gravity (Nojiri & Odintsov 2005, 2007; Cognola 2007; Fayaz et al. 2015; Abbas et al. 2015;Sharif & Fatima 2016) where f ( G ) is a generic function of the Gauss-Bonnet invariant G . Also the theory whichcombines Ricci scalar and Gauss-Bonnet scalar called f ( R, G ) gravity theory (Alvaro & Diego 2012; Shekh & Chirde2019; Makarenko et al. 2013; Atazadeh & Darabi 2014; Laurentis & Revelles 2015; Shekh et al. 2020). One thegravitational action includes an arbitrary function of the Ricci scalar and trace of the stress energy tensor known as f ( R, T ) gravity. Several authors such as Sahoo & Mishra (2014), Chirde & Shekh (2015, 2016b), Pawar & Agrawal(2017) who have investigated the aspects of cosmological models in this gravity. Among the various modifications ofEinstein’s theory, another one way to look at the theory beyond the Einstein equation is the Teleparallel Gravitywhich uses the Weitzenbock connection in place of the Levi–Civita connection and so it has no curvature but hastorsion which is responsible for the acceleration of the Universe. Some relevant works in this gravity are the graphicalrepresentation of k-essence with the help of equation of state parameter describe by Sharif & Rani (2011). In f ( T )gravity the existence of relativistic stars investigated by Bohmer et al. (2011). Chirde & Shekh (2014) have discussedsome cosmological model with different sources. Gamal & Nashed (2015) investigated anisotropic models with twofluids in linear and quadratic forms of f ( T )gravitational models. Recently, Bhoyar et al. (2017) discussed stabilityof accelerating Universe with linear equation of state parameter in f ( T ) gravity using hybrid expansion law.Bianchi type cosmological models are significant in the sense that these are homogeneous and anisotropic. Bianchitype space times provide spatially homogeneous and anisotropic models of the universe as compared to the homoge-neous and isotropic FRW models, from which the course of action of isotropization of the universe is well thought-outthe passage of time. The simplicity of the field equations and relative ease of the solutions of Bianchi space timesare useful in constructing models of spatially homogeneous and anisotropic cosmologies. Spatially homogeneous andanisotropic cosmological models play a significant role in the description of large scale behavior of the universe andsuch models have been widely studied many authors in search of relativistic picture of the early universe. Mohanty etal. (2003), Pradhan et al. (2011), Kumar & Yadav (2011), Yadav & Saha (2012) are the some authors who have beenextensively investigated an anisotropic Bianchi type-I, Bianchi type-III, Bianchi type-V dark energy models with theusual perfect fluid. Recently, Sarkar & Mahanta (2013) have studied a homogeneous and anisotropic axially symmetricBianchi type-I universe filled with matter and holographic dark energy energy components by assuming decelerationparameter to be a constant, along with the correspondence between the holographic dark energy models with thequintessence dark energy and reconstruction of the Quintessence potential and the dynamics of the quintessence scalarfield in an accelerated expansion of the universe. Mishra et al. (2017) who have investigated the anisotropic behaviorof the accelerating universe with the matter field of two non-interacting fluids usual string fluid and dark energyfluid and achieve a physically reasonable clarification using hybrid scale factor, which is generated by a time-varyingdeceleration parameter and observed that the string fluid dominates the universe at early deceleration phase butdoes not influence nature of cosmic dynamics significantly at late phase, whereas the dark energy fluid dominates theuniverse in present time, which is in accordance with the observations results. Chirde & Shekh (2018a; 2018b) haveinvestigated the dynamics of Bianchi type-I space–time filled with two minimally interacting fields, matter and Holo-graphic dark energy components with volumetric power and exponential expansion laws and the transition betweengeneral relativity and quantum gravity using quark and strange quark matter respectively towards the gravitationalfield equations for the linear form of f ( T ) gravity and observed that both models are at late times turn out to beflat Universe, the power law model has to begin with singular and stable but at spreading out it is unstable whileexponential model is free from any types of singularities and stable throughout the expansion. In the same way themodels represents its spreading as accelerated with inflationary era in the early and the very late time of the Universe.For suitably large time resulting model expects that the anisotropy of the Universe will damp out and the Universewill become isotropic. Very recently, Pawar et al. (2019) the author who have studied the modified holographic Riccidark energy model in f ( R, T ) theory of gravity by using anisotropy Bianchi type Universe and observed that themodel has no physical singularity, the Universe is expanding and accelerating exponentially.
II. PRELIMINARY DEFINITIONS AND EQUATIONS OF MOTION OF f ( T ) GRAVITY: In this section we give a brief description of f ( T ) gravity and a detailed derivation of its field equations. Letus define the notations of the Latin subscript as these related to the tetrad field and the greek one related to thespace-time coordinates. For a general space-time metric, we can define the line element as dS = g µν dx µ dx ν , (1)where g µν are the components of the metric which is symmetric and possesses ten degrees of freedom. One candescribe the theory in the space-time or in the tangent space, which allows us to rewrite the line element which canbe converted to the Minkowski’s description of the transformation called tetrad (which represent the dynamic fieldsof the theory), as follows dS = g µν dx µ dx ν = η ij θ i θ j , (2) dx µ = e µi θ i , θ i = e iµ dx µ , (3)where η ij is a metric on Minkowski space-time and η ij = diag [1 , − , − , −
1] and e µi e iν = δ µν or e µi e jµ = δ ji . The rootof metric determinant is given by √− g = det[ e iµ ] = e . For a manifold in which the Riemann tensor part withoutthe torsion terms is null (contribution of the Levi-Civita connection) and only the non-zero torsion terms exist, theWeitzenbocks connection components are defined asΓ αµν = e αi ∂ ν e iµ = − e iµ ∂ ν e αi . (4)which has a zero curvature but nonzero torsion. The main geometrical objects of the space-time are constructedfrom this connection. Through the connection, the components of the tensor torsion are defined by the antisymmetricpart of this connection as T αµν = Γ αµν − Γ ανµ = e αi (cid:0) ∂ µ e iν − ∂ µ e iµ (cid:1) , (5)The difference between the Levi-Civita and Weitzenbock connections is a space-time tensor, and is known as thecontorsion tensor: K µνα = (cid:18) − (cid:19) ( T µνα + T νµα − T µνα ) . (6)In order to make more clear the definition of the scalar equivalent to the curvature scalar of RG, we first define a newtensor S µνα , constructed from the components of the tensors torsion and contorsion tensor as S µνα = (cid:18) (cid:19) (cid:0) K µνα + δ µα T βνβ − δ να T βµβ (cid:1) . (7)The torsion scalar T is T = T αµν S µνα . (8)Now, we define the action by generalizing the TG i.e. f ( T ) theory as S = (cid:90) [ T + f ( T ) + L matter ] e d x. (9)Here, f ( T ) denotes an algebraic function of the torsion scalar T . Making the functional variation of the action (9)with respect to the tetrads, we get the following equations of motion S νρµ ∂ ρ T f
T T + (cid:2) e − e iµ ∂ ρ ( ee αi S νρα ) + T αλµ S νλα (cid:3) f T + 14 δ νµ ( f ) = 4 π ( T νµ ( CS ) + ¯ T νµ ( DE ) ) . (10)The field equation (10) is written in terms of the tetrad and partial derivatives and appears very different fromEinstein’s equation.where T νµ is the energy momentum tensor, f T = df ( T ) /dT , f T T = d f ( T ) /dT and by setting f ( T ) = a = constantthe equations of motion (10) are the same as that of the Teleparallel Gravity with a cosmological constant, and this isdynamically equivalent to the GR. These equations clearly depend on the choice made for the set of tetrads. T νµ ( CS ) and ¯ T νµ ( DE ) respectively, denote the contribution to energy–momentum tensor from one-dimensional cosmic stringand dark energy.In recent years, Cosmologists have taken considerable interest in the study of cosmic strings due to the challengingproblem to determine the exact physical scenario at very early stages of the formation of the Universe. Since, theybelieved that string plays an important role in the description of the Universe in the early stages of evolution (thesearise during the phase transition after the big-bang explosion as the temperature decreased below some criticaltemperature as predicted by grand unified theories) (Kibble 1976). Cosmic string is topologically stable objects thatmight be found during a phase transition in the early universe and give rise to density perturbations leading to theformation of galaxies (Zeldovich 1980). The innovative work in the formation of the energy-momentum tensor forclassical massive strings was done by Letelier (1983), who used this idea to obtain a cosmological solution for Bianchi-Iand Kantowski-Sachs space-times by considering the massive strings to be formed by geometric strings with particleattached along its extension. As in our investigations, one matter content is string cloud fluid. So that the energymomentum tensor for cloud string is defined as T νµ ( CS ) = ( ρ + p ) u ν u µ − p g νµ + λx ν x µ , (11)where u ν is the four velocity of the string cloud, x ν is the normal space-like four-vector, the pressure p for this fluidis taken to be isotropic, ρ and λ are the proper energy density for a cloud of strings and the tension density ofthe string cloud respectively. Here we consider the string source is along z -axis, which is the axis of symmetry, anorthonormalizsation of u ν and x ν is given by u ν u ν = 1 , u ν x ν = 0 , x ν x ν = − , (12)where u ν = (0 , , ,
1) and x ν = (cid:0) A − , , , (cid:1) .Saha et al. (2010) investigated Bianchi type-I cosmological model in the presence of a magnetic flux along with a cosmicstring using some tractable assumptions regarding the parameters entering the model and obtained the analyticalresults which are supplemented with numerical and qualitative analysis describing the evolution of the Universefor different values of the parameters. Sahoo (2015) have studied the non-singular, non-rotating and expandingLRS Bianchi type-I cosmological model in modified gravity with cosmic string and observed that the transition ofthe universe from decelerated phase to the accelerated phase at late times in accordance with the observations ofmodern cosmology. The existence of the late time acceleration of the universe with string fluid as source of matterin anisotropic Heckmann-Suchking space-time by using high red shift (0 . ≤ z ≤ .
4) SNe-Ia data of observedcomplete magnitude along with their possible error from Union 2.1 compilation. It is found that the best fit valuesfor (Ω m ) , (Ω Λ ) , (Ω σ ) and ( q ) are 0.2820, 0.7177, 0.0002 & -0.5793 respectively offered Goswami et al . (2016).The energy–momentum tensor for isotropic dark energy can be described as¯ T νµ ( DE ) = diag [ − ρ Λ , p Λ , p Λ , p Λ ]= diag [ − , ω Λ , ω Λ , ω Λ ] ρ Λ , (13)where ω Λ is the equation of state parameter for dark energy and ρ Λ is the dark energy density. III. FIELD EQUATIONS FOR BIANCHI TYPE-I MODEL:
Let us first establish the equations of motion of a set of diagonal tetrads using the Cartesian coordinate metric, fordescribing models of Bianchi type-I, as ds = dt − A dx − B dy − C dz , (14)Let us choose the following set of diagonal tetrads related to the metric (14)[ e νµ ] = diag [1 , A, B, C ] . (15)The determinant of the matrix (14) is e = ABC. (16)The components of the tensor torsion (5) for the tetrads (15) are given by T = ˙ AA , T = ˙
BB , T = ˙
CC . (17)and the components of the corresponding tensor contorsion are K = ˙ AA , K = ˙
BB , K = ˙
CC , S = 12 (cid:32) ˙ AA + ˙ BB (cid:33) . (18)The components of the tensor S µµν , in (7), are given by S = 12 (cid:32) ˙ BB + ˙ CC (cid:33) , S = 12 (cid:32) ˙ AA + ˙ CC (cid:33) , S = 12 (cid:32) ˙ AA + ˙ BB (cid:33) . (19)The corresponding torsion scalar (8) is given by T = − (cid:32) ˙ AA ˙ BB + ˙ AA ˙ C ˙ C + ˙ BB ˙ CC (cid:33) . (20)Now, the field equations in the framework of f ( T )gravity (10) for a two-fluid cosmic string (11) and dark energy (13)Bianchi type-I space-time (14) are obtained as f + 4 f T (cid:40) ˙ AA ˙ BB + ˙ AA ˙ CC + ˙ BB ˙ CC − α A (cid:41) = ( ρ + ρ Λ ) , (21) f + 2 f T (cid:40) ¨ BB + ¨ CC + ˙ AA ˙ BB + ˙ AA ˙ CC + 2 ˙ BB ˙ CC (cid:41) + 2 (cid:32) ˙ BB + ˙ CC (cid:33) ˙ T f
T T = − ( p + ω Λ ρ Λ ) , (22) f + 2 f T (cid:40) ¨ AA + ¨ CC + ˙ AA ˙ BB + 2 ˙ AA ˙ CC + ˙ BB ˙ CC (cid:41) + 2 (cid:32) ˙ AA + ˙ CC (cid:33) ˙ T f
T T = − ( p + ω Λ ρ Λ ) , (23) f + 2 f T (cid:40) ¨ AA + ¨ BB + 2 ˙ AA ˙ BB + ˙ AA ˙ CC + ˙ BB ˙ CC − α A (cid:41) + 2 (cid:32) ˙ AA + ˙ BB (cid:33) ˙ T f
T T = − ( p + λ + ω Λ ρ Λ ) , (24)where the dot ( · ) denotes the derivative with respect to cosmic time t . In the particular case where f ( T ) = T − A, B, f, p, ρ, λ, ρ Λ , ω Λ . The solution of these equations is discussed in nextsection. In the following we define some kinematical quantities of the space-time. We define average scale factor andvolume respectively as R = V = ABC. (25)Another important dimensionless kinematical quantity is the mean deceleration parameter which tells whether theUniverse exhibits accelerating volumetric expansion or not is q = − ddt (cid:18) H (cid:19) , (26)for − ≤ q < q > q = 0 the Universe exhibit accelerating volumetric expansion, decelerating volumetricexpansion and expansion with constant-rate respectively. The mean Hubble parameter, which expresses the volumetricexpansion rate of the Universe, given as H = 13 ( H + H + H ) , (27)where H , H and H are the directional Hubble parameter in the direction of x, y and z -axis respectively. Usingequations (25) and (27), we obtain H = 13 ˙ VV = 13 ( H + H + H ) = ˙ RR . (28)To discuss whether the Universe either approach isotropy or not, we define an anisotropy parameter as A m = 13 (cid:88) i =1 (cid:18) H i − HH (cid:19) . (29)The expansion scalar and shear scalar are defined as follows θ = u µ ; µ = ˙ AA + ˙ BB + ˙ CC , (30) σ = 32 H A m . (31) IV. SOLUTION OF THE FIELD EQUATIONS:
In order to solve the field equations completely, we first assume that the matter and holographic dark energycomponents i.e. the energy momentum tensors of the two sources interact minimally and conserved separately. Theenergy conservation equation of the matter leads to( ˙ ρ ) + ˙ VV ( ρ ) = 0 . (32) ρ = 1 V . (33)In this section we find exact solutions of field equations using some physical quantities for linear f ( T ) gravity i.e. f ( T ) = T. (34)Now subtracting (22) from (23), we get ddt (cid:32) ˙ AA − ˙ BB (cid:33) + (cid:32) ˙ AA − ˙ BB (cid:33) ˙ VV = 0 , (35)which on integration gives AB = k exp (cid:20) k (cid:90) dtV (cid:21) , (36)where k and k are constants of integration. In view of equation (25), we write A and B in the explicit form A = D V exp (cid:18) χ (cid:90) V dt (cid:19) , (37) B = D V exp (cid:18) χ (cid:90) V dt (cid:19) , (38)where D i ( i = 1 ,
2) and χ i ( i = 1 ,
2) satisfy the relation D D = 1 and χ + 2 χ = 0. Exact matter dominated power law solution of the field equation
Since field equations are highly nonlinear, an extra condition is needed to solve the system completely. So,we have chosen the scale factor of the form V = R = t b (39)where b be the any positive constant. The motivation to choose such scale factor is that the universe has acceleratedexpansion at present and decelerated expansion in the past. Here we are considering the minimally interacting butconserve separately matter and holographic dark energy components. Using equations (37), (38) and (39), we obtainthe metric potentials as follows: A = D t b exp (cid:26) χ (1 − b ) t − b (cid:27) , (40) B = D t b exp (cid:26) χ (1 − b ) t − b (cid:27) , (41)and C = 1 D D t b exp (cid:26) χ (1 − b ) t − b (cid:27) . (42)From the equations (40) to (42), it is observed that the metric potentials A, B and C are the product of powerand exponential form and increase indefinitely with the passage of time. With the help of equations (40) to (42),our spatially homogeneous and anisotropic Bianchi type-I space-time filled with cosmic string and holographic darkenergy fluid within the framework of f ( T ) gravity becomes ds = dt − D t b exp (cid:26) χ (1 − b ) t − b (cid:27) dx − D t b exp (cid:26) χ (1 − b ) t − b (cid:27) dy − D D t b exp (cid:26) χ (1 − b ) t − b (cid:27) dz . (43)All the metric potentials in the derived model are vanishes at t = 0. Hence, the model has no initial singularity.Afterwards, increase indefinitely with the passage of time, which is in complete agreement with the Big-Bang modelof the Universe and the model is similar to the investigation those of Chirde & Shekh (2018). FIG. 1: Graphical representation of average scale factor and spatial volume versus cosmic time with appropriate choice ofconstant b = 2. V. KINEMATICAL PARAMETERS:
Spatial volume and Average scale factor, V = R = t b (44)The expansion scalar, θ = bt , (45)The mean Hubble parameter, H = b t . (46)We observe that the spatial volume and average scale factor both are die out at t →
0. Thus, no singularity existsat t → t →
0. The behavior is shown inFIG-1. The expansion scalar decreases as time increases and the mean Hubble parameter is initially large at t → t → ∞ . The expansion scalar θ → t → ∞ which indicates that the universe is expanding withincrease of time and the rate of expansion decreases with the increase of time. This suggests that at initial stage ofthe universe, the expansion of the model is much more faster and then slows down for later time i.e. the evolution ofthe universe starts with infinite rate, and with expansion, it declines (see FIG-2).An anisotropy parameter, A m = 18 χ b t b − . (47)The shear scalar, σ = 9 χ t b . (48)The anisotropic parameter and the shear scalar both are the inverse function of time. Thus the nature of theanisotropic parameter is varying with the evaluation of the universe. Initially both are in high elevation and at aninfinite expansion it is seen that the model has shear free and that of anisotropy parameter disappears in the model.The behavior of the anisotropy parameter and shear scalar versus cosmic time t is shown in FIG-3. FIG. 2: Graphical representation of Hubble’s parameter and expansion scalar versus cosmic time with appropriate choice ofconstant b = 2.FIG. 3: Graphical representation of anisotropy parameter and shear scalar versus cosmic time with appropriate choice ofconstants b = 2 and χ = 1. VI. PHYSICAL PARAMETERS:
The Torsion scalar for the model becomes T = − χ χ t b − b ( χ + χ )3 t b +1 − b t (49)The Torsion of the Universe is time dependent and decreases very rapidly for the interval of cosmic time 1 ≤ t ≤ . t > . ρ = 1 t b . (50) FIG. 4: Graphical representation of Torsion scalar versus cosmic time with appropriate choice of constants b = 2, χ = − χ = 1.FIG. 5: Graphical representation of energy density versus cosmic time with appropriate choice of constants b = 2, χ = − χ = 1. The energy density of Holographic dark energy is, ρ Λ = χ ( χ + χ ) t b + (cid:18) b ( χ + 3 χ ) t b +1 (cid:19) − t b + 2 b t . (51)In power law expansion of the Universe, it is observed that the energy density is always positive and decreasingfunction of cosmic time t . At the initial stage the Universe has infinitely large energy density but with the expansionof the Universe it declines and at very large expansion, it is null. The behavior is clearly shown in FIG-5.The equation of state parameter for Holographic dark energy is, ω Λ = (cid:16) χ (2 χ − χ − ω ) t b + b (2 χ − χ − ω )3 t b +1 (cid:17)(cid:16) χ ( χ + χ ) t b + (cid:16) b ( χ +3 χ ) t b +1 (cid:17) − t b + b t (cid:17) . (52)Recently a large class of scalar field dark energy models has been given including Quintessence ( ω Λ > − ω Λ < −
1) and Quinton (which can cross from the Phantom region to the quintessence region). The Quinton scenario0
FIG. 6: Graphical representation of Equation of State parameter versus cosmic time with appropriate choice of constants b = 2, χ = − χ = 1 and ω = 1 / of dark energy is designed to understand the nature of dark energy with ω Λ cross −
1. Setare & Saridakis (2015) havestudied the dark energy models with the equation of state parameter across ( − − . < ω Λ < − .
62 and − . < ω Λ < − .
79 respectively. The latest result in 2009, obtained after acombination of cosmological data sets coming from CMB anisotropy, luminosity distances of high red-shift SNe-Ia,and galaxy clustering constrain the dark energy equation of state parameter to − . < ω Λ < − .
92. In the derivedmodel, the equation of state parameter is evolving with a positive sign i.e. ω Λ > . ≤ t ≤ .
05, for the interval 0 . ≤ t ≤ .
73 themodel shows quintessence region while at late times at t > .
73 it be present in matter dominated once, whichmay be established from the current accelerated expansion of the universe. From figure- vi , we observed that at theinitial time there is a quintessence region, and at late time it approaches the cosmological constant scenario. Thisis a situation in the early universe where the quintessence-dominated universe (Caldwell 2002) may be playing animportant role for the equation of state parameter. If the present model is compared with the experimental resultsmentioned above, one can conclude that the limit of equation of state parameter provided by Eq. (31) for someinterval of time it may be accumulated with the acceptable range of equation of state parameter (see Fig-6). Thismodel confirms the high red-shift supernova experiment.The tension density of the string cloud is λ = (cid:20) χ t b + b t (cid:21) (cid:26) ω + 4 χ − χ t b (cid:27) − ωt b − χ t b (cid:20) χ t b + b t (cid:21) . (53)As the cosmologists have taken considerable interest in the study of cosmic strings. Since, they believed that stringplays an important role in the description of the Universe in the early stages of evolution i.e. arise during the phasetransition after the big bang explosion as the temperature decreased below some critical temperature as predicted bygrand unified theories also which is a topologically stable objects that might be found during a phase transition in theearly universe, Letelier (1983) pointed out that tension density of the string cloud may be positive or negative. In ourinvestigation it is initially positive hence the strings exist in the early universe occupying the small universe, whichis in agreement with constraints of CMBR data but with the expansion of the Universe it gradually decreases andremain present with negative value i.e. λ < < υ s = ∂p∂ρ .1 FIG. 7: Graphical representation of tension density of the string cloud versus cosmic time with appropriate choice of constants b = 2, χ = − χ = 1 and ω = 1 / b = 2, χ = − χ = 1 and ω = 1 / In our derived model, the sound speeds is obtained as υ s = (cid:16) bχ (2 χ + ω ) t b +1 + b ( b +1)(2 χ + ω )3 t b +2 (cid:17)(cid:16) bχ t b +1 + bt b +1 − bχ ( b +1) t b − b t (cid:17) . (54)From the FIG-8, it is observed that initially for 0 < t ≤ .
90 stability factor υ s > υ s < VII. CONCLUSION
The Torsion of the Universe is time varying and falls very rapidly for 1 ≤ t ≤ . t > . . ≤ t ≤ .
05, for the interval 0 . ≤ t ≤ .
73 the model showsquintessence region which may be established from the current accelerated expansion of the universe while at latetimes at t > .
73 it is present in matter dominated once. At the initial time there is a quintessence region, and atlate time it is baryonic matter. This is a situation in the early universe where the quintessence-dominated universemay be playing an important role for the equation of state parameter. If the present model is compared with theexperimental results, it may be accumulated with the acceptable range of equation of state parameter. This modelconfirms the high red-shift supernova experiment.Initially the cosmic string has positive, hence the strings exist in the early universe occupying the small universe,which is in agreement with constraints of CMBR data but with the expansion of the Universe it gradually decreases andremain present with negative value i.e. λ <
References
Abbas G., Momeni D., Ali M. A., Myrzakulov R., Qaisar S.:
Astrophys. Space Sci.
158 (2015)Agrawal P. K., Pawar D. D.:
New Astronomy , 56 (2017)Akarsu O., Kilinc C. B.: Astrophys Space Sci. , 315 (2010)Atazadeh K., Darabi F.:
Gen Relativ Gravit Phys. Lett . B
210 (2008)Bartelmann M.:
Rev. Mod. Phys. , , 331 (2010)Bhoyar S. R., Chirde V. R., Shekh S. H.: Astrophysics
277 (2017)Bohmer C., Mussa A., Tamanini N.:
Class. Quant. Grav. Phys. Lett. B,
23, (2002)Chirde V. R,, Shekh S. H.:
Bulgerian journal of physics
57 (2016a)Chirde V. R., Shekh S. H.:
Astrophysics , 106 (2015). https://doi.org/10.1007/s10511-015-9369-6Chirde V. R., Shekh S. H.: Bulgerian J. Phys.
258 (2014)Chirde V. R., Shekh S. H.:
Indian J. of Phy., J. Astrophys. Astron.
J. Astrophys. Astron.
39, 56 (2018b)Chirde V. R., Shekh S. H.:
Journal of Theoretical Physics & Criptography
14 (2017)Cognola G., Elizalde E., Nojiri S., Odintsov S. D., Zerbini, S.:
Phys. Rev. D Astrophys. Space Sci.
136 (2015)Fischler W., Susskind L.: hep-th/9806039 (1998)Gamal G., Nashed:
Astrophys. Space Sci.,
Astrophys Space Sci , 47 (2016)Granda L. N., Oliveros A.:
Phys. Lett. B , , 275 (2008)Hooft G.: gr-qc/ 9310026 (1993)Kibble T.: J. Phys. A: Math. Gen . , 1387 (1976)Knop et al . R. A.: The Astrophysical Journal , , 102 (2003)Kumar S., Yadav A. K.: Mod. Phys. Lett. A , 647 (2011)Laurentis M. D., Lopez-Revelles A. J.: Int. J. Geom. Methods Mod. Phys. Phys. Rev. D , 2414 (1983)Lvaro De. C., Diego S. G.: Class. Quant. Grav.
24 (2012)Mahanta K. L., Biswal A.K., Sahoo P.K.:
Canadian Journal of Physics (4) 295 (2014)Makarenko A. N., Obukhov V. V., Kirnos I. V.: Astrophys Space Sci
481 (2013)Mishra B., Sahoo P. K., Ray P. P.:
Int. J. of Geo. Methods in Modern Phy. (9) 1750124 (2017)Mohanty G., Sahu S. K., Sahoo P. K.: Astrophys Space Sci , 523 (2003)Nojiri S., Odintsov S. D.:
J. Phys. Conf. Ser . Phys. Lett. B
J. Astrophys. Astron , 13 (2019)Pawar D. D., Solanke Y. S., Shahare S. P.: Bulgerian J. Phys , 41 , 60 (2014)Pawar D. D., Solanke Y. S.:
Int. Journal of Theoretical Physics (9), 3052 (2014a)Pradhan et al. A.:
Int. Journal of Theoretical Physics , 2923 (2011)Saha b., Rikhvitsky V., Visinescu M.: Cent. Eur. J. Phys . (1) 113 (2010)Sahoo P. K.: Fortschr. Phys. , 414 (2015)Sahoo P., Mishra B., Chakradhar G., Reddy D.: Eur. Phys. J. Plus
49 (2014)Sarkar s., Mahanta C. R.:
Int. Journal of Theoretical Physics, (5)1482 (2013) Sarkar S.:
Astrophys Space Sci
985 (2014)Setare M. R.:
Phys. Lett. B , , 116, (2007)Setare R., Saridakis: Phys. Rev. D. . 043005 (2015)Sharif M., Fatima H. I.: Int. J. Mod. Phys. D Phys. Scr. J. Cosmo. Astropart. Phys.
06 (2014)Shekh S. H., Arora Simran, Chirde V. R.,
Sahoo P. K.:
Int. J. of geom. methods in mod. phy.,DOI:10.1142/S0219887820500486 (2020)Shekh S. H., Chirde V. R.:
Gen Relativ Gravit
87 (2019)Singh K. M., Mandal S., Devi L. P., Sahoo P. K.:
New Astronomy European Physical Journal C (12) 1020 (2019)Tegmark et al . M.: Phys. Rev. D. , 103501 (2004b)Tegmark M., Blanton M. R., Strauss M. A.: The Astrophysical Journal , , (2) 702 (2004a)Thomas S.: Phys. Rev. Lett. , , 081301, (2002)Turner M. S., Huterer D.: J. Phys. Soc. Jpn., , 111015 (2007)Wei H., Cai R.: Phys. Lett. B , , 113, (2008)Yadav A. K., Saha B.: Astrophys Space Sci , 759 (2012)Zel’dovich Y. B.:
Sov. Phys. Usp. , , 381 (1968)Zeldovich I.: MNRAS192