Optimal isoperimetric inequalities for complete proper minimal submanifolds in hyperbolic space

Abstract

Let be a k-dimensional complete proper minimal submanifold in the Poincar\'e ball model Bn of hyperbolic geometry. If we consider as a subset of the unit ball Bn in Euclidean space, we can measure the Euclidean volumes of the given minimal submanifold and the ideal boundary ∂∞ , say () and (∂∞ ), respectively. Using this concept, we prove an optimal linear isoperimetric inequality. We also prove that if (∂∞ ) ≥ (Sk-1), then satisfies the classical isoperimetric inequality. By proving the monotonicity theorem for such , we further obtain a sharp lower bound for the Euclidean volume (), which is an extension of Fraser and Schoen's recent result FS to hyperbolic space. Moreover we introduce the M\"obius volume of in Bn to prove an isoperimetric inequality via the M\"obius volume for .