Improved Upper Bound to the Entropy of a Charged System
arXiv:gr-qc/9903011 · doi:10.1103/PhysRevD.61.024023
Abstract
Recently, we derived an improved universal upper bound to the entropy of a charged system $S \leq Ï(2E b-q^2)/ \hbar$. There was, however, some uncertainty in the value of the numerical factor which multiplies the $q^2$ term. In this paper we remove this uncertainty; we rederive this upper bound from an application of the generalized second law of thermodynamics to a gedanken experiment in which an entropy-bearing charged system falls into a Schwarzschild black hole. A crucial step in the analysis is the inclusion of the effect of the spacetime curvature on the electrostatic self-interaction of the charged system.
8 pages