Entropy Product Function and Central charges in NUT Geometry

Abstract

We define an entropy product function~(EPF) for Taub-Newman-Unti-Tamburino~(TNUT) black hole~(BH) following the prescription suggested by Wu et al.~wu ~[PRD 100, 101501(R) (2019)]. The prescription argues that a generic four-dimensional TNUT spacetime might be expressed in terms of three or four different types of thermodynamic hairs. They can be defined as the Komar mass~(M=m), the angular momentum~(Jn=mn), the gravitomagnetic charge (N=n), the dual~(magnetic) mass (M=n). Taking this prescription and using the EPF, we derive the central charges of dual CFT~(conformal field theory) via Cardy's formula. Remarkably, we find that for TNUT BH there exists a relation between the central charges and EPF as c=6(∂ F∂ Ni), where F is EPF and Ni is one of the integer-valued charges i.e. the NUT charges~(N) or any new conserved charges~(JN). We reverify these results by calculating the exact values of different thermodynamic parameters. We define the EPF~ F from the first law of thermodynamics of both horizons. Moreover, we write the first laws of both the horizons for left-moving and right-moving sectors. Introducing the B\'ezout's identity, we show that for TNUT BH one can generate more holographic descriptions described by a pair of integers (a,b). More holographic pictures have a great significance in understanding the holographic nature of quantum gravity. Furthermore, using the EPF we derive the central charges for Reissner-Nordstr\"om-NUT~(RNNUT) BH, Kerr-Taub-NUT~(KNUT) BH and Kerr-Newman-NUT~(KNNUT) BH. Finally, we prove that they are equal in both sectors provided that the EPF is mass-independent~(or universal).