Proof of the entropy bound on dynamical horizons

Abstract

The entropy bound conjecture concerning black hole dynamical horizons is proved. The conjecture states, if a dynamical horizon, DH, is bounded by two surfaces with areas of AB and (>AB), then the entropy, SD, that crosses DH must satisfy SD≤ 1/4(-AB). We show that this conjecture is implied by the generalized Bousso bound. Consequently, the generalized second law holds for dynamical horizons. Finally, we show that the lightlike bousso bound and its spacelike counterpart can be unified as one bound.