Exact differential and corrected area law for stationary black holes in tunneling method

We give a new and conceptually simple approach to obtain the ``first law of black hole thermodynamics'' from a basic thermodynamical property that entropy (S) for any stationary black hole is a state function implying that dS must be an exact differential. Using this property we obtain some conditions which are analogous to Maxwell's relations in ordinary thermodynamics. From these conditions we are able to explicitly calculate the semiclassical Bekenstein-Hawking entropy, considering the most general metric represented by the Kerr-Newman spacetime. We extend our method to find the corrected entropy of stationary black holes in (3+1) dimensions. For that we first calculate the corrected Hawking temperature considering both scalar particle and fermion tunneling beyond the semiclassical approximation. Using this corrected Hawking temperature we compute the corrected entropy, based on properties of exact differentials. The connection of the coefficient of the leading (logarithmic) correction with the trace anomaly of the stress tensor is established. We explicitly calculate this coefficient for stationary black holes with various metrics, emphasising the role of Komar integrals.

[1]  R. Banerjee,et al.  Quantum tunneling and trace anomaly , 2008, 0808.3688.

[2]  B. Dewitt,et al.  Quantum field theory in curved spacetime , 1975 .

[3]  Sujoy K. Modak Corrected entropy of BTZ black hole in tunneling approach , 2008, 0807.0959.

[4]  X. Zu,et al.  Fermions tunnelling from the charged dilatonic black holes , 2008, 0803.3248.

[5]  R. Banerjee,et al.  Hawking black body spectrum from tunneling mechanism , 2009, 0903.0250.

[6]  Sujoy K. Modak,et al.  Area Law in Noncommutative Schwarzschild Black Hole , 2008 .

[7]  Thermal radiation of various gravitational backgrounds , 2006, hep-th/0605137.

[8]  J. Bekenstein Black Holes and Entropy , 1973, Jacob Bekenstein.

[9]  S. Carlip,et al.  Logarithmic corrections to black hole entropy, from the Cardy formula , 2000 .

[10]  Stephen W. Hawking,et al.  Black Holes and Thermodynamics , 1976 .

[11]  Complex Paths and Covariance of Hawking Radiation in 2D Stringy Black Holes , 2001, hep-th/0111047.

[12]  F. Wilczek,et al.  Hawking radiation As tunneling , 1999, Physical review letters.

[13]  Temperature and entropy of Schwarzschild–de Sitter space-time , 2003, gr-qc/0301090.

[14]  Ji-rong Ren,et al.  Corrections to Hawking-like radiation for a Friedmann–Robertson–Walker universe , 2008, 0811.4074.

[15]  Hawking radiation as tunneling through the quantum horizon , 2005, hep-th/0505266.

[16]  H. M. Siahaan,et al.  Hawking Radiation from a Vaidya Black Hole: A Semi-Classical Approach and Beyond , 2008, 0811.1132.

[17]  Jian-yang Zhu,et al.  Hawking radiation and black hole entropy in a gravity’s rainbow , 2008 .

[18]  Jian-yang Zhu,et al.  Hawking radiation as tunneling from Gravity's rainbow , 2007, gr-qc/0703055.

[19]  Bibhas Ranjan Majhi,et al.  Fermion tunneling beyond semiclassical approximation , 2008, 0809.1508.

[20]  Logarithmic Corrections to Black Hole Entropy and AdS/CFT Correspondence , 2002, hep-th/0205164.

[21]  S. Carroll,et al.  Extremal limits and black hole entropy , 2009, 0901.0931.

[22]  P. Mitra Hawking temperature from tunnelling formalism , 2006, hep-th/0611265.

[23]  Terry Pilling,et al.  Black hole thermodynamics and the factor of 2 problem , 2007, 0709.1624.

[24]  M. Nadalini,et al.  Hawking radiation as tunneling for extremal and rotating black holes , 2005, hep-th/0503081.

[25]  S. Bose Hawking Radiation due to Photon and Gravitino Tunneling , 2009 .

[26]  Bibhas Ranjan Majhi,et al.  Quantum Tunneling and Back Reaction , 2007, 0801.0200.

[27]  R. Banerjee,et al.  Quantum Tunneling, Trace Anomaly and Effective Metric , 2008 .

[28]  Majumdar,et al.  Logarithmic correction to the bekenstein-hawking entropy , 2000, Physical review letters.

[29]  F. Felice,et al.  The total effective mass of the Kerr–Newman metric , 1984 .

[30]  D. Singleton,et al.  Hawking temperature in the tunneling picture , 2006, hep-th/0608098.

[31]  L. Vanzo,et al.  Fermion tunneling from dynamical horizons , 2008, 0803.0435.

[32]  R. Mann,et al.  Universality of quantum entropy for extreme black holes , 1997, hep-th/9709064.

[33]  J. Katz A note on Komar's anomalous factor , 1985 .

[34]  Particle production and complex path analysis , 1998, gr-qc/9812028.

[35]  Zheng Zhao,et al.  A NOTE ON THE HAWKING RADIATION CALCULATED BY THE QUASICLASSICAL TUNNELING METHOD , 2009, 0901.2680.

[36]  L. Sriramkumar,et al.  Subleading contributions to the black hole entropy in the brick wall approach , 2007, 0710.2013.

[37]  R. Mann,et al.  Charged fermions tunnelling from Kerr–Newman black holes , 2008, 0803.2246.

[38]  Hawking radiation of Dirac particles via tunnelling from rotating black holes in de Sitter spaces , 2008, 0804.0131.

[39]  Sujoy K. Modak,et al.  Noncommutative Schwarzschild Black Hole and Area Law , 2008, 0802.2176.

[40]  R. Banerjee,et al.  Connecting anomaly and tunneling methods for the Hawking effect through chirality , 2008, 0812.0497.

[41]  Peng Dan-tao,et al.  Hawking Radiation as Tunneling and the Unified First Law of Thermodynamics at the Apparent Horizon of the FRW Universe , 2009 .

[42]  Q. Jiang Dirac particle tunneling from black rings , 2008, 0807.1358.

[43]  A. Komar Covariant conservation laws in general relativity , 1959 .

[44]  Bibhas Ranjan Majhi,et al.  Quantum tunneling beyond semiclassical approximation , 2008, 0805.2220.

[45]  Zheng Zhao,et al.  MASSIVE UNCHARGED AND CHARGED PARTICLES' TUNNELING FROM THE HOROWITZ–STROMINGER DILATON BLACK HOLE , 2006, gr-qc/0611085.

[46]  Brandon Carter,et al.  The four laws of black hole mechanics , 1973 .

[47]  J. Brannlund,et al.  Phase space and black-hole entropy of higher genus horizons in loop quantum gravity , 2007, gr-qc/0702036.

[48]  Jingyi Zhang,et al.  Black hole quantum tunnelling and black hole entropy correction , 2008, 0806.2441.

[49]  Zheng Zhao,et al.  Massive particles' Hawking radiation via tunneling from the G.H Dilaton black hole , 2006, gr-qc/0611026.

[50]  Ran Li,et al.  Fermions tunneling from apparent horizon of FRW universe , 2008, 0812.4217.

[51]  Tunnelling, temperature and Taub-NUT black holes , 2006, gr-qc/0603019.

[52]  R. Rosenfeld Nature , 2009, Otolaryngology--head and neck surgery : official journal of American Academy of Otolaryngology-Head and Neck Surgery.

[53]  S. Hawking Particle creation by black holes , 1975 .

[54]  S. Berman,et al.  Nuovo Cimento , 1983 .

[55]  S. Samanta,et al.  Noncommutative black hole thermodynamics , 2008, 0801.3583.

[56]  S. Hawking,et al.  Black hole explosions? , 1974, Nature.

[57]  Ran Li,et al.  Dirac particles tunneling from BTZ black hole , 2008, 0802.3954.

[58]  Ran Li,et al.  Hawking radiation of Dirac particles via tunneling from the Kerr black hole , 2008, 0803.1410.

[59]  D. Singleton,et al.  Subtleties in the quasi-classical calculation of Hawking radiation , 2008, 0805.2653.

[60]  Hawking radiation of charged particles as tunneling from Reissner–Nordström–de Sitter black holes with a global monopole , 2006 .

[61]  THE SCATTERING MATRIX APPROACH FOR THE QUANTUM BLACK HOLE: AN OVERVIEW , 1996, gr-qc/9607022.

[62]  John Ellis,et al.  Int. J. Mod. Phys. , 2005 .

[63]  Method of complex paths and general covariance of Hawking radiation , 2000, gr-qc/0007022.

[64]  S. More Higher order corrections to black hole entropy , 2004, gr-qc/0410071.

[65]  Stephen W. Hawking Zeta function regularization of path integrals in curved spacetime , 1977 .

[66]  R. Mann,et al.  Fermions tunnelling from black holes , 2007, 0710.0612.

[67]  Peng Dan-tao,et al.  Hawking Radiation as Tunneling and the Unified First Law of Thermodynamics at the Apparent Horizon of the FRW Universe , 2008, 0812.3006.

[68]  Maulik K. Parikh A SECRET TUNNEL THROUGH THE HORIZON , 2004 .

[69]  Hawking radiation in different coordinate settings: Complex paths approach , 2000, gr-qc/0010042.

[70]  Sean M. Carroll,et al.  Spacetime and Geometry: An Introduction to General Relativity , 2003 .

[71]  Borun D. Chowdhury Problems with tunneling of thin shells from black holes , 2006, hep-th/0605197.

[72]  Saurya Das,et al.  General logarithmic corrections to black-hole entropy , 2001, hep-th/0111001.

[73]  J. Bekenstein Generalized second law of thermodynamics in black-hole physics , 1974, Jacob Bekenstein.

[74]  R. Banerjee,et al.  Corrections to Unruh effect in tunneling formalism and mapping with Hawking effect , 2009, 0901.0466.

[75]  Q. Jiang Fermions tunnelling from GHS and non-extremal D1–D5 black holes , 2008 .