Characterizing the Strong Maximum Principle
Analysis of PDEs
2017-12-12 v2 Complex Variables
Differential Geometry
Abstract
In this paper we characterize the degenerate elliptic equations F(D^2u)=0 whose viscosity subsolutions, (F(D^2u) \geq 0), satisfy the strong maximum principle. We introduce an easily computed function f(t) for t > 0, determined by F, and we show that the strong maximum principle holds depending on whether the integral \int dy / f(y) near 0 is infinite or finite. This complements our previous work characterizing when the (ordinary) maximum principle holds. Along the way we characterize radial subsolutions.
Keywords
Cite
@article{arxiv.1309.1738,
title = {Characterizing the Strong Maximum Principle},
author = {F. Reese Harvey and H. Blaine Lawson},
journal= {arXiv preprint arXiv:1309.1738},
year = {2017}
}
Comments
Minor expository revisions