Differential inclusions and polycrystals
Analysis of PDEs
2025-05-02 v3
Abstract
We study the differential inclusion , where is an unbounded and rotationally invariant subset of the real symmetric matrices. We exhibit a subset of all possible average fields. The corresponding microgeometries are laminates of infinite rank. The problem originated in the search for the effective conductivity of polycrystalline composites. In the latter context, our result is an improvement of the previously known bounds established by Nesi Milton, hence proving the optimality of a new full-measure class of microgeometries.
Cite
@article{arxiv.2402.06401,
title = {Differential inclusions and polycrystals},
author = {Nathan Albin and Vincenzo Nesi and Mariapia Palombaro},
journal= {arXiv preprint arXiv:2402.06401},
year = {2025}
}
Comments
The original version of this manuscript will be split into two parts. This is the first part