The Monge-Ampere system in dimension two and codimension three

Abstract

We revisit the convex integration constructions for the Monge-Amp\`ere system and prove its flexibility in dimension d=2 and codimension k=3, up to C1,1-1/5. To our knowledge, it is the first result in which the obtained H\"older exponent 1-15 is larger than 1/2 but it is not contained in the full flexibility up to C1,1 result. Previous various approaches, based on Kuiper's corrugations, always led to the H\"older regularity not exceeding C1,1/2, while constructions based on the Nash spirals (when applicable) led to the regularity C1,1. Combining the two approaches towards an interpolation between their corresponding exponent ranges has been so far an open problem.