A doubly nonlinear evolution for the optimal Poincar\'e inequality
Analysis of PDEs
2016-07-01 v5
Abstract
We study the large time behavior of solutions of the PDE . A special property of this equation is that the Rayleigh quotient is nonincreasing in time along solutions. As tends to infinity, this ratio converges to the optimal constant in Poincar\'{e}'s inequality. Moreover, appropriately scaled solutions converge to a function for which equality holds in this inequality. An interesting limiting equation also arises when tends to infinity, which provides a new approach to approximating ground states of the infinity Laplacian.
Keywords
Cite
@article{arxiv.1404.5077,
title = {A doubly nonlinear evolution for the optimal Poincar\'e inequality},
author = {Ryan Hynd and Erik Lindgren},
journal= {arXiv preprint arXiv:1404.5077},
year = {2016}
}