Variations of Renormalized Volume for Minimal Submanifolds of Poincare-Einstein Manifolds

Abstract

We investigate the asymptotic expansion and the renormalized volume of minimal submanifolds, Ym of arbitrary codimension in Poincare-Einstein manifolds, Mn+1. In particular, we derive formulae for the first and second variations of renormalized volume for Ym ⊂eq Mn+1 when m < n + 1. We apply our formulae to the codimension 1 and the M = Hn+1 case. Furthermore, we prove the existence of an asymptotic description of our minimal submanifold, Y, over the boundary cylinder ∂ Y × R+, and we further derive an L2-inner-product relationship between u2 and um+1 when M = Hn+1. Our results apply to a slightly more general class of manifolds, which are conformally compact with a metric that has an even expansion up to high order near the boundary.