Higher codimension relative isoperimetric inequality outside a convex set

Abstract

We consider an isoperimetric inequality for (m+1)-dimensional area minimizing submanifolds of arbitrary codimension which lie outside a convex set K ⊂ Rn+1 and are bounded by a submanifold of Rn+1 K and the convex set K. We show that the least value of the isoperimetric ratio is attained for an (m+1)-dimensional flat half-disk of Rn+1+. This extends prior work of Choe, Ghomi, and Ritor\'e in codimension one and proves a conjecture of Choe in the case of relative area minimizers.