English

Lower semicontinuity for functionals defined on piecewise rigid functions and on $GSBD$

Analysis of PDEs 2020-12-08 v3

Abstract

In this work, we provide a characterization result for lower semicontinuity of surface energies defined on piecewise rigid functions, i.e., functions which are piecewise affine on a Caccioppoli partition where the derivative in each component is a skew symmetric matrix. This characterization is achieved by means of an integral condition, called BDBD-ellipticity, which is in the spirit of BVBV-ellipticity defined by Ambrosio and Braides. By specific examples we show that this novel concept is in fact stronger compared to its BVBV analog. We further provide a sufficient condition implying BDBD-ellipticity which we call symmetric joint convexity. This notion can be checked explicitly for certain classes of surface energies which are relevant for applications, e.g., for variational fracture models. Finally, we give a direct proof that surface energies with symmetric jointly convex integrands are lower semicontinuous also on the larger space of GSBDpGSBD^p functions.

Keywords

Cite

@article{arxiv.2002.08133,
  title  = {Lower semicontinuity for functionals defined on piecewise rigid functions and on $GSBD$},
  author = {Manuel Friedrich and Matteo Perugini and Francesco Solombrino},
  journal= {arXiv preprint arXiv:2002.08133},
  year   = {2020}
}
R2 v1 2026-06-23T13:46:42.489Z