Existence and Regularizing Effects of a Nonlinear Diffusion Model for Plasma Instabilities
Analysis of PDEs
2025-03-19 v1 Mathematical Physics
math.MP
Plasma Physics
Abstract
We study existence and regularity of weak solutions to a nonlinear parabolic Dirichlet problem on the half line . We find weak solutions from initial data, and by means of a Benilan-Crandall inequality, show solutions are jointly Holder continuous, and locally, spatially Lipschitz on the parabolic interior. We identify special solutions which saturate these bounds. The Benilan-Crandall inequality, derived from time-scaling arguments, is of independent interest for exposing a regularizing effect of the parabolic uu operator. Recently considered in [11], this problem originates in the theory of nonlinear instability damping via wave-particle interactions in plasma physics (see [8, 22]).
Cite
@article{arxiv.2503.13922,
title = {Existence and Regularizing Effects of a Nonlinear Diffusion Model for Plasma Instabilities},
author = {William Porteous and Irene M. Gamba and Kun Huang},
journal= {arXiv preprint arXiv:2503.13922},
year = {2025}
}