The quasiconvex envelope of conformally invariant planar energy functions in isotropic hyperelasticity

Abstract

We consider conformally invariant energies W on the group GL+(2) of 2×2-matrices with positive determinant, i.e. WGL+(2) such that \[W(AFB) = W(F) all \; A,B∈\aR∈GL+(2) \,|\, a∈(0,∞)\,,\; R∈SO(2)\\,,\] where SO(2) denotes the special orthogonal group, and provide an explicit formula for the (notoriously difficult to compute) quasiconvex envelope of these functions. Our results, which are based on the representation W(F)=h(λ1λ2) of W in terms of the singular values λ1,λ2 of F, are applied to a number of example energies in order to demonstrate the convenience of the eigenvalue-based expression compared to the more common representation in terms of the distortion K:=12 F2 F. Special cases of our results can be obtained from earlier works by Astala et al. and Yan.