The Monge-Ampere system: convex integration with improved regularity in dimension two and arbitrary codimension

Abstract

We prove a convex integration result for the Monge-Ampere system in dimension d=2 and arbitrary codimension k≥ 1. We achieve flexibility up to the Holder regularity C1,11+ 4/k, improving hence the previous C1,11+ 6/k regularity that followed from flexibility up to C1,11+d(d+1)/k in our previous work, valid for any d,k≥ 1. The present result agrees with flexibility up to C1,15 for d=2, k=1 obtained by Conti, Delellis, Szekelyhidi, as well as with the C1,α result where α 1 as k∞, due to Kallen.