The exponentiated Hencky-logarithmic strain energy. Improvement of planar polyconvexity

Abstract

In this paper we improve the result about the polyconvexity of the energies from the family of isotropic volumetric-isochoric decoupled strain exponentiated Hencky energies defined in the first part of this series, i.e. W_ eH(F)= \arraylll μk\,ek\,\| devn U\|2+2\,k\,ek\,[( det U)]2&if& det\, F>0,\\ +∞ &if & det F≤ 0\,, array. where F=∇ is the gradient of deformation, U=FT F is the right stretch tensor and devn U is the deviatoric part of the strain tensor U. The main result in this paper is that in plane elastostatics, i.e. for n=2, the energies of this family are polyconvex for k≥ 14, k≥ 18, extending a previous result which proves polyconvexity for k≥ 13, k≥ 18. This leads immediately to an extension of the existence result.