Abstract
We have presented a method of obtaining parametric classes of spherically symmetric analytic solutions of the general relativistic field equations in canonical coordinates. A number of previously known classes of solutions have been rediscovered which describe perfect fluid balls with infinite central pressure and infinite central density though their ratio is positively finite and less than one. From the solution of one of the newly discovered classes, we have constructed a causal model in which outmarch of pressure and density is positive and monotonically decreasing, and pressure-density ratio is positive and less than one throughout within the balls. Corresponding to this model, we have maximized the Neutron star mass 2.40 with the linear dimensions of 28.43βkms and surface red shift of 0.4142.
1. Introduction
Due to nonlinearity of the Einsteinβs field equations, many attempts have been reported to obtain parametric classes of exact solutions of representing perfect fluid ball in equilibrium such as Tolman [1], Wyman [2], Kuchowich [3], Pant and Sah [4], D.N. Pant and N. Pant [5], Pant [6, 7], Pant [8], Delgaty, Lake [9], Lake [10], Tewari and Pant [11], and Maurya, Gupta [12]. These solutions have four arbitrary constants. The usual boundary conditions determine three arbitrary constants leaving one undetermined; such a solution represents a class of solutions, with undetermined constant being a parameter. The edge of a parametric class of solutions over an ordinary solution lies in the choice of associated parameter which provides us various models of relativistic stars with realistic equation of state. Moreover, by imposing realistic conditions on parameter, one may get physical and significant solutions. Thus in the light of importance of parametric class, in this paper, we present a variety of parametric classes of solutions.
2. Field Equations and Method of Obtaining Parametric Classes of Solutions
We consider the static and spherically symmetric metric in canonical coordinates where and are field variables and functions of only. The field equations of gravitation for a nonempty space-time are where is a Ricci tensor, is energy-momentum tensor, and the scalar curvature. The energy-momentum tensor is defined as where denotes the pressure distribution, the density distribution, and the velocity vector, satisfying the relation
Since the field is static, therefore, only a nonzero component of velocity is
Thus, under these conditions, the field equations of general relativity for a perfect fluid ball the physical variables and are (Tolman[1]) where prime denotes differentiation with respect to . The problem consists of solving (8) for and and obtaining and from (6) and (7).
By using the transformation Equation (8) reduces to the following linear differential equation in : On solving (10), we getwhere ββ is an arbitrary constant. Our aim is to explore the possibilities of choosing such that the right-hand side of (11) becomes integrable. In this paper, we assume, , and are arbitrary constants. Equation (12) results into a second degree homogenous differential equation in U The solution is where provided, .
and are arbitrary constants. Also (11) is simplified into where The solution is complete if (17) is integrated. In the foregoing sections, we shall discuss the method of solving (17), which will result into the variety of classes of solutions.
3. Varieties of Classes of Solutions
To explore the integrability of (17), we substitute
So that (17) transforms into It is easy to see that right-hand side of (20) can be integrated by parts with the restriction on the exponents of integrand to be nonnegative integral values. Thus we arrive at varieties of classes of solutions.
3.1. Class I (new class of solutions)
We assume and . In view of (18) and (20), the resulting class of solutions is where We observe that becomes singular for all values except . It may be pointed out here that for , we rediscover Tolmanβs IV solution which is the only member of the class giving rise to finite central pressure and central density.
4. Properties of the New Class of Solutions
In view of (21), we obtain from (6) and (7), the pressure and density distribution, respectively,
The central values of pressure and density are infinite; however, the limiting value of their ratio is finite and equal to the limiting value of :
The causality condition at the centre is valid for all those values of satisfying the inequality .
In addition to the parameter , the solutions (21) contain three arbitrary constants , , and . These are to be determined by matching the solutions (21) with Schwarzschild exterior solution for a ball of mass and linear dimension : where Consequently,
For to be definitely positive in the region , we must have . Thus in view of (27) and (28), we have
5. Particular Member of Class I for
In this section, we shall present a detail study of the particular solution corresponding to .
The solution is In view of (30) to be definitely positive in the region , then Corresponding to and in view of (27), (28), and (29), the constants are
In Table 1 the march of pressure, density, pressure-density ratio, and square of adiabatic sound speed is given for . We observe that pressure and density decrease monotonically with the increase of radial coordinate, pressure-density ratio, and square of adiabatic sound speed, which is positive and less than 1 throughout within the ball.
We now present here a model of Neutron star based on the particular solution discussed above. The Neutron star is supposed to have a surface density: suggested by Brecher and Caporaso [13]. The resulting causal model has the mass and the linear dimension . The surface red shift .
6. Some More Parametric Classes of Solutions
By assigning the different nonnegative integral values to the exponents of (20), we obtain the following different parametric classes of solutions.
6.1. Class II
If we assume and . In view of (17), (18), and (20), the resulting class of solutions is (see Neeraj Pant [6])
6.2. Class III
If we assume and . In view of (17), (18), and (20), the resulting class of solutions is (see Pant [8])
6.3. Class IV
If we assume and . In view of (17), (18), and (20), the resulting class of solutions is (see Pant [8]) where
6.4. Class V
If we assume and . In view of (17), (18), and (20), the resulting class of solutions is (New Class of Solutions) where denotes and denotes ,
6.5. Class VI
If we assume and . In view of (17), (18), and (20), the resulting class of solutions is (New Class of Solutions) where denotes .
6.6. Class VII
If we assume and . In view of (17), (18), and (20), the resulting class of solutions is (see Tewari and Pant [11])
7. Conclusion
By assigning different nonnegative integral values to the any two pairs of exponents of integrand of (17), that is, , we arrive at different parametric classes of solutions. All these classes have of the form For meaningful solutions , to be nonnegative, thus restriction on parameter ranges.
Acknowledgments
The author expresses his gratitude to Professer O. P. Shukla, Principal NDA, for his encouragement. He is also grateful to the anonymous referees for pointing out the errors in the original paper and making constructive and relevant suggestions.