TL;DR
This paper reviews the calculation of black hole entropy in Loop Quantum Gravity, highlighting the area law, the Barbero-Immirzi parameter, and the universal logarithmic correction across different theories.
Contribution
It provides a comprehensive survey of entropy calculations in SU(2) and U(1) formulations within Loop Quantum Gravity, emphasizing the universal logarithmic correction.
Findings
Leading entropy proportional to horizon area with Barbero-Immirzi dependent coefficient
Logarithmic correction to entropy with coefficient -3/2
Universal appearance of logarithmic correction in various quantum gravity models
Abstract
In the Loop Quantum Gravity, black holes (or even more general Isolated Horizons) are described by a SU(2) Chern-Simons theory. There is an equivalent formulation of the horizon degrees of freedom in terms of a U(1) gauge theory which is just a gauged fixed version of the SU(2) theory. These developments will be surveyed here. Quantum theory based on either formulation can be used to count the horizon micro-states associated with quantum geometry fluctuations and from this the micro-canonical entropy can be obtained. We shall review the computation in SU(2) formulation. Leading term in the entropy is proportional to horizon area with a coefficient depending on the Barbero-Immirzi parameter which is fixed by matching this result with the Bekenstein-Hawking formula. Remarkably there are corrections beyond the area term, the leading one is logarithm of the horizon area with a definite…
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