Existence and optimal regularity theory for weak solutions of free transmission problems of quasilinear type via Leray-Lions method

TL;DR

This paper establishes existence and regularity results for weak solutions of a class of free transmission quasilinear PDEs, using Leray-Lions methods and techniques inspired by viscosity solutions, with precise regularity estimates.

Contribution

It introduces a novel approach combining Leray-Lions method with viscosity solution techniques to analyze free transmission problems of quasilinear type.

Findings

Existence of weak solutions in W^{1,p}(B_1)

Solutions are locally C^{0,α} for all α in (0,1)

Provides explicit regularity estimates for solutions

Abstract

We study existence and regularity of weak solutions for the following PDE $$ -\dive(A(x,u)|\nabla u|^{p-2}\nabla u) = f(x,u),\;\;\mbox{in $B_1$}. $$ where $A(x,s) = A_+(x)\chi_{\{s>0\}}+A_-(x)\chi_{\{s\le 0\}}$ and $f(x,s) = f_+(x)\chi_{\{s>0\}}+f_-(x)\chi_{\{s\le 0\}}$. Under the ellipticity assumption that $\frac{1}{\mu}\le A_{\pm} \le \mu$, $A_{\pm}\in C(\O)$ and $f_{\pm}\in L^N(\O)$, we prove that under appropriate conditions the PDE above admits a weak solution in $W^{1,p}(B_1)$ which is also $C^{0,\alpha}_{loc}$ for every $\alpha\in (0,1)$ with precise estimates. Our methods relies on similar techniques as those developed by Caffarelli to treat viscosity solutions for fully non-linear PDEs (c.f. \cite{C89}). Other key ingredients in our proofs are the $\TT_{a,b}$ operator (which was introduced in \cite{MS22}) and Leray-Lions method (c.f. \cite{BM92}, \cite{MT03}).