Tartar’s conjecture and localization of the quasiconvex hull in $ \mathbb{R}^{{2 \times 2}} $

Daniel Faraco, László Székelyhidi

Type: Article

Publication Date: 2008-01-01

Citations: 46

DOI: https://doi.org/10.1007/s11511-008-0028-1

Abstract

We give a concrete and surprisingly simple characterization of compact sets $ K \subset \mathbb{R}^{{2 \times 2}} $ for which families of approximate solutions to the inclusion problem Du∈K are compact. In particular our condition is algebraic and can be tested algorithmically. We also prove that the quasiconvex hull of compact sets of 2 × 2 matrices can be localized. This is false for compact sets in higher dimensions in general.

Locations

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+	Geometric Function Theory and Non-linear Analysis	2001	Tadeusz Iwaniec Gaven Martin
+	Real and Complex Analysis.	1987	G. A. Garreau Walter Rudin
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