On the quantum width of a black hole horizon
Abstract
The many low energy modes near a black hole horizon give the thermal atmosphere a divergent entropy which becomes of order A/4G with a Planck scale cut-off. However, Sorkin has given a Newtonian argument for 3+1 Schwarzschild black holes to the effect that fluctuations of such modes provide the horizon with a non-zero quantum mechanical width. This width then effectively enforces a cut-off at much larger distances so that the entropy of the thermal atmosphere is negligible in comparison with A/4G for large black holes. We generalize and improve this result by giving a relativistic argument valid for any spherical black hole in any dimension. The result is again a cut-off Lc at a geometric mean of the Planck scale and the black hole radius; in particular, Lcd RTH pd-2. With this cut-off, the entropy of the thermal atmosphere is again parametrically small in comparison with the Bekenstein-Hawking entropy of the black hole. The effect of a large number N of fundamental fields and the discrepancies from naive predictions of a stretched horizon model are also discussed.
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