Optimization under second order constraints: are the finite element discretizations consistent ?
Analysis of PDEs
2017-04-04 v2
Abstract
It is proved in Chon{\'e} and Le Meur (2001) that the problem of minimizing a Dirichlet-like functional of the function discretized with Finite Elements, under the constraint that be convex, cannot converge. Here, we first improve this result by proving that non-convergence is due to the mesh refinment lack of richness, remains local and is true even for any mesh. Then, we investigate the consistency of various natural discretizations ( and ) of second order constraints (subharmonicity and convexity) without discussing the convergence. We also numerically illustrate convergence of a method proposed in the literature that is simpler than existing methods.
Cite
@article{arxiv.1309.1433,
title = {Optimization under second order constraints: are the finite element discretizations consistent ?},
author = {Hervé Le Meur},
journal= {arXiv preprint arXiv:1309.1433},
year = {2017}
}