Orientation-preserving Young measures
Abstract
We prove a characterization result in the spirit of the Kinderlehrer-Pedregal Theorem for Young measures generated by gradients of Sobolev maps satisfying the orientation-preserving constraint, that is the pointwise Jacobian is positive almost everywhere. The argument to construct the appropriate generating sequences from such Young measures is based on a variant of convex integration in conjunction with an explicit lamination construction in matrix space. Our generating sequence is bounded in for less than the space dimension, a regime in which the pointwise Jacobian loses some of its important properties. On the other hand, for larger than, or equal to, the space dimension the situation necessarily becomes rigid and a construction as presented here cannot succeed. Applications to relaxation of integral functionals, the theory of semiconvex hulls, and approximation of weakly orientation-preserving maps by strictly orientation-preserving ones in Sobolev spaces are given.
Cite
@article{arxiv.1307.1007,
title = {Orientation-preserving Young measures},
author = {Konstantinos Koumatos and Filip Rindler and Emil Wiedemann},
journal= {arXiv preprint arXiv:1307.1007},
year = {2014}
}
Comments
23 pages