On quasinormal modes in 4D black hole solutions in the model with anisotropic fluid

Abstract

We consider a family of 4-dimensional black hole solutions from Dehnen et al. ( Grav. Cosmol. 9:153, arXiv: gr-qc/0211049, 2003) governed by natural number q= 1, 2, 3 , …, which appear in the model with anisotropic fluid and the equations of state: pr = - (2q-1)-1, pt = - pr, where pr and pt are pressures in radial and transverse directions, respectively, and > 0 is the density. These equations of state obey weak, strong and dominant energy conditions. For q = 1 the metric of the solution coincides with that of the Reissner-Nordstr\"om one. The global structure of solutions is outlined, giving rise to Carter-Penrose diagram of Reissner-Nordstr\"om or Schwarzschild types for odd q = 2k + 1 or even q = 2k, respectively. Certain physical parameters corresponding to BH solutions (gravitational mass, PPN parameters, Hawking temperature and entropy) are calculated. We obtain and analyse the quasinormal modes for a test massless scalar field in the eikonal approximation. For limiting case q = + ∞, they coincide with the well-known results for the Schwarzschild solution. We show that the Hod conjecture which connect the Hawking temperature and the damping rate is obeyed for all q ≥ 2 and all (allowed) values of parameters.