Quantum fluxes at the inner horizon of a near-extremal spherical charged black hole

Abstract

We analyze and compute the semiclassical stress-energy flux components, the outflux Tuu and the influx Tvv (u and v being the standard null Eddington coordinates), at the inner horizon (IH) of a Reissner-Nordstr\"om black hole (BH) of mass M and charge Q, in the near-extremal domain in which Q/M approaches 1. We consider a minimally-coupled massless quantum scalar field, in both Hartle-Hawking (H) and Unruh (U) states, the latter corresponding to an evaporating BH. The near-extremal domain lends itself to an analytical treatment which sheds light on the behavior of various quantities on approaching extremality. We explore the behavior of the three near-IH flux quantities Tuu-U, Tvv-U, and Tuu-H= Tvv-H, as a function of the small parameter 1-(Q/M)2 (where the superscript "-" refers to the IH value). We find that in the near-extremal domain Tuu-U Tuu-H= Tvv-H behaves as 5. In contrast, Tvv-U behaves as 4, and we calculate the prefactor analytically. It therefore follows that the semiclassical fluxes at the IH neighborhood of an evaporating near-extremal spherical charged BH are dominated by the influx TvvU. In passing, we also find an analytical expression for the transmission coefficient outside a Reissner-Nordstr\"om BH to leading order in small frequencies (which turns out to be a crucial ingredient of our near-extremal analysis). Furthermore, we explicitly obtain the near-extremal Hawking-evaporation rate (4), with an analytical expression for the prefactor (obtained here for the first time to the best of our knowledge). [Abridged]