The quasiconvex hull for the five-gradient problem (Q2380798)

The author constructs the rank-one convex hull \(K^{rc}\) of the set \(K\) considered in [\textit{B. Kirchheim}, Geometry and rigidity of microstructures (Habil.). Univ. Leipzig, Fakultät Mathematik/ Informatik (2001; Zbl 1140.74303)] that consists of five \(2\times 2\) symmetric matrices without rank-one connections for which there exists a Lipschitz mapping \(u\) such that the essential range of its gradient is contained in \(K\). He proves that for each \(F\in intK^{rc}\) there exists a Lipschitz mapping \(u:\Omega \subset \mathbb{R}^{2}\longrightarrow \mathbb{R}^{2},\) with \(\Omega \) open, satisfying \(Du\in K\) and \(u(x)=Fx\) for \(x\in \partial \Omega \), and that the rank-one convex hull of \(K\) agrees with the quasiconvex hull of \(K\).