Topolgical Charged Black Holes in Generalized Horava-Lifshitz Gravity

TL;DR

This paper explores topological charged black hole solutions within generalized Hořava-Lifshitz gravity across various dimensions, analyzing their properties, thermodynamics, and asymptotic behaviors, thus advancing understanding of quantum gravity models at high energies.

Contribution

It provides the first comprehensive analysis of topological charged black holes in arbitrary dimensional HL gravity with generic parameters, including their thermodynamics and asymptotic behaviors.

Findings

Explicit solutions for topological charged black holes in multiple dimensions.

Analysis of thermodynamic properties such as temperature, entropy, and free energy.

Insights into the asymptotic behavior near boundaries and horizons.

Abstract

As a candidate of quantum gravity in ultrahigh energy, the $(3+1)$-dimensional Ho\v{r}ava-Lifshitz (HL) gravity with critical exponent $z\ne 1$, indicates anisotropy between time and space at short distance. In the paper, we investigate the most general $z=d$ Ho\v{r}ava-Lifshitz gravity in arbitrary spatial dimension $d$, with a generic dynamical Ricci flow parameter $\lambda$ and a detailed balance violation parameter $\epsilon$. In arbitrary dimensional generalized HL$_{d+1}$ gravity with $z\ge d$ at long distance, we study the topological neutral black hole solutions with general $\lambda$ in $z=d$ HL$_{d+1}$, as well as the topological charged black holes with $\lambda=1$ in $z=d$ HL$_{d+1}$. The HL gravity in the Lagrangian formulation is adopted, while in the Hamiltonian formulation, it reduces to Dirac$-$De Witt's canonical gravity with $\lambda=1$. In particular, the topological charged black holes in $z=5$ HL$_6$, $z=4$ HL$_5$, $z=3,4$ HL$_4$ and $z=2$ HL$_3$ with $\lambda=1$ 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 $\lambda=1$, including temperature, entropy, heat capacity, and free energy are evaluated.