A condition for the Holder regularity of strong local minimizers of a nonlinear elastic energy in two dimensions

Abstract

We prove the local H\"older continuity of strong local minimizers of the stored energy functional \[E(u)=∫λ |∇ u|2+h( ∇ u) \,dx\] subject to a condition of `positive twist'. The latter turns out to be equivalent to requiring that u maps circles to suitably star-shaped sets. The convex function h(s) grows logarithmically as s 0+, linearly as s +∞, and satisfies h(s)=+∞ if s ≤ 0. These properties encode a constitutive condition which ensures that material does not interpenetrate during a deformation and is one of the principal obstacles to proving the regularity of local or global minimizers. The main innovation is to prove that if a local minimizer has positive twist a.e. on a ball then an Euler-Lagrange type inequality holds and a Caccioppoli inequality can be derived from it. The claimed H\"older continuity then follows by adapting some well-known elliptic regularity theory. We also demonstrate the regularizing effect that the term ∫ h( ∇ u)\,dx can have by analysing the regularity of local minimizers in the class of `shear maps'. In this setting a more easily verifiable condition than that of positive twist is imposed, with the result that local minimizers are H\"older continuous.