Convex integration with linear constraints and its applications
Abstract
We study solutions of the first order partial differential inclusions of the form ∇ u∈ K, where u:⊂Rnm and K is a set of m× n real matrices, and derive a companion version to the result of M\"uller and Sver\'ak [20], concerning a general linear constraint on the components of ∇ u. We then consider two applications: the vectorial eikonal equation and a T4-configuration both under linear constraints.
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