Integral inequalities for infimal convolution and Hamilton-Jacobi equations
Functional Analysis
2015-01-20 v1
Abstract
Let be Borel measurable, bounded below and such that We prove that with the inequality holds in every Orlicz space where denotes the infimal convolution of and and where is the Luxemburg norm (i.e., the norm when ). Although no genuine reverse inequality can hold in any generality, we also prove that such reverse inequalities do exist in the form where and are suitable transforms of and introduced in the paper and reminiscent of, yet very different from, nondecreasing rearrangement. Similar inequalities are proved for other extremal operations and applications are given to the long-time behavior of the solutions of the Hamilton-Jacobi and related equations.
Cite
@article{arxiv.1501.04513,
title = {Integral inequalities for infimal convolution and Hamilton-Jacobi equations},
author = {Patrick J. Rabier},
journal= {arXiv preprint arXiv:1501.04513},
year = {2015}
}
Comments
To appear in Journal of Convex Analysis