English

Boundary regularity for the porous medium equation

Analysis of PDEs 2020-06-05 v1

Abstract

We study the boundary regularity of solutions to the porous medium equation ut=Δumu_t = \Delta u^m in the degenerate range m>1m>1. In particular, we show that in cylinders the Dirichlet problem with positive continuous boundary data on the parabolic boundary has a solution which attains the boundary values, provided that the spatial domain satisfies the elliptic Wiener criterion. This condition is known to be optimal, and it is a consequence of our main theorem which establishes a barrier characterization of regular boundary points for general -- not necessarily cylindrical -- domains in Rn+1{\bf R}^{n+1}. One of our fundamental tools is a new strict comparison principle between sub- and superparabolic functions, which makes it essential for us to study both nonstrict and strict Perron solutions to be able to develop a fruitful boundary regularity theory. Several other comparison principles and pasting lemmas are also obtained. In the process we obtain a rather complete picture of the relation between sub/super\-para\-bolic functions and weak sub/super\-solu\-tions.

Keywords

Cite

@article{arxiv.1801.08005,
  title  = {Boundary regularity for the porous medium equation},
  author = {Anders Björn and Jana Björn and Ugo Gianazza and Juhana Siljander},
  journal= {arXiv preprint arXiv:1801.08005},
  year   = {2020}
}

Comments

40 pages

R2 v1 2026-06-22T23:54:13.761Z