Gaussian null coordinates, near-horizon geometry and conserved charges on the horizon of extremal non-dilatonic black p-branes

Abstract

In this paper, we examine the emergence of conserved charges on the horizon of a particular class of extremal non-dilatonic black p-branes (which reduce to extremal dilatonic black holes in D=4 dimensions upon toroidal compactification) in the presence of a probe massless scalar field in the bulk. This result is achieved by writing the black p-brane geometry in a Gaussian null coordinate system which allows us to get a non-singular near-horizon geometry description. We find that the near-horizon geometry is AdSp+2× S2 and that the AdSp+2 section has an internal structure which can be seen as a warped product of AdS2× Sp in Gaussian null coordinates. We show that the bulk scalar field satisfying the field equations is expanded in terms of non-normalizable and normalizable modes, which for certain suitable quantization conditions are well-behaved at the boundary of AdSp+2 space. Furthermore, we show that picking the normalizable modes results in the existence of conserved quantities on the horizon. We discuss the impact of these conserved quantities in the late time regime.