Existence of Integral m-Varifolds minimizing ∫ |A|p and ∫ |H|p, p>m, in Riemannian Manifolds

Abstract

We prove existence and partial regularity of integral rectifiable m-dimensional varifolds minimizing functionals of the type ∫ |H|p and ∫ |A|p in a given Riemannian n-dimensional manifold (N,g), 2≤ m<n and p>m, under suitable assumptions on N (in the end of the paper we give many examples of such ambient manifolds). To this aim we introduce the following new tools: some monotonicity formulas for varifolds in RS involving ∫ |H|p, to avoid degeneracy of the minimizer, and a sort of isoperimetric inequality to bound the mass in terms of the mentioned functionals.