Numerical approaches for investigating quasiconvexity in the context of Morrey's conjecture

Abstract

Deciding whether a given function is quasiconvex is generally a difficult task. Here, we discuss a number of numerical approaches that can be used in the search for a counterexample to the quasiconvexity of a given function W. We will demonstrate these methods using the planar isotropic rank-one convex function \[ W magic+(F)=λ maxλ min-λ maxλ min+ F=λ maxλ min+2λ min\,, \] where λ max≥λ min are the singular values of F, as our main example. In a previous contribution, we have shown that quasiconvexity of this function would imply quasiconvexity for all rank-one convex isotropic planar energies W:GL+(2)→R with an additive volumetric-isochoric split of the form \[ W(F)=W iso(F)+W vol( F)= W iso(F F)+W vol( F) \] with a concave volumetric part. This example is therefore of particular interest with regard to Morrey's open question whether or not rank-one convexity implies quasiconvexity in the planar case.