A rank-one convex, non-polyconvex isotropic function on GL+(2) with compact connected sublevel sets

Abstract

According to a 2002 theorem by Cardaliaguet and Tahraoui, an isotropic, compact and connected subset of the group GL+(2) of invertible 2×2-\,matrices is rank-one convex if and only if it is polyconvex. In a 2005 Journal of Convex Analysis article by Alexander~Mielke, it has been conjectured that the equivalence of rank-one convexity and polyconvexity holds for isotropic functions on GL+(2) as well, provided their sublevel sets satisfy the corresponding requirements. We negatively answer this conjecture by giving an explicit example of a function W:GL+ which is not polyconvex, but rank-one convex as well as isotropic with compact and connected sublevel sets.