Convex Integration Solutions for the Geometrically Non-linear Two-Well Problem with Higher Sobolev Regularity

Abstract

In this article we discuss higher Sobolev regularity of convex integration solutions for the geometrically non-linear two-well problem. More precisely, we construct solutions to the differential inclusion ∇ u∈ K subject to suitable affine boundary conditions for u with K:= SO(2)[array ccc 1 & δ \\ 0 & 1 array] SO(2)[array ccc 1 & -δ \\ 0 & 1 array] such that the associated deformation gradients ∇ u enjoy higher Sobolev regularity. This provides the first result in the modelling of phase transformations in shape-memory alloys where Kqc ≠ Kc, and where the energy minimisers constructed by convex integration satisfy higher Sobolev regularity. We show that in spite of additional difficulties arising from the treatment of the non-linear matrix space geometry, it is possible to deal with the geometrically non-linear two-well problem within the framework outlined in RZZ18. Physically, our investigation of convex integration solutions at higher Sobolev regularity is motivated by viewing regularity as a possible selection mechanism of microstructures.