Higher dimensional generalization of Buchdahl-Vaidya-Tikekar model for super compact star

Abstract

We obtain higher dimensional solutions for super compact star for the Buchdahl-Vaidya-Tikekar metric ansatz. In particular, Vaidya and Tikekar characterized the 3-geometry by a parameter, K which is related to the sign of density gradient. It turns out that the key pressure isotropy equation continues to have the same Gauss form, and hence 4-dimensional solutions can be taken over to higher dimensions with K satisfying the relation, Kn = (K4-n+4)/(n-3) where subscript refers to dimension of spacetime. Further K≥0 is required else density would have undesirable feature of increasing with radius, and the equality indicates a constant density star described by the Schwarzschild interior solution. This means for a given K4, maximum dimension could only be n=K4+4, else Kn will turn negative.