Topolgical Charged Black Holes in Generalized Horava-Lifshitz Gravity

Abstract

As a candidate of quantum gravity in ultrahigh energy, the (3+1)-dimensional Horava-Lifshitz (HL) gravity with critical exponent z 1, indicates anisotropy between time and space at short distance. In the paper, we investigate the most general z=d Horava-Lifshitz gravity in arbitrary spatial dimension d, with a generic dynamical Ricci flow parameter λ and a detailed balance violation parameter ε. In arbitrary dimensional generalized HLd+1 gravity with z d at long distance, we study the topological neutral black hole solutions with general λ in z=d HLd+1, as well as the topological charged black holes with λ=1 in z=d HLd+1. The HL gravity in the Lagrangian formulation is adopted, while in the Hamiltonian formulation, it reduces to Dirac-De Witt's canonical gravity with λ=1. In particular, the topological charged black holes in z=5 HL6, z=4 HL5, z=3,4 HL4 and z=2 HL3 with λ=1 are solved. Their asymptotical behaviors near the infinite boundary and near the horizon are explored respectively. We also study the behavior of the topological black holes in the (d+1)-dimensional HL gravity with U(1) gauge field in the zero temperature limit and finite temperature limit, respectively. Thermodynamics of the topological charged black holes with λ=1, including temperature, entropy, heat capacity, and free energy are evaluated.