The Dirichlet problem for semi-linear equations
Abstract
We study the Dirichlet problem for the semi--linear partial differential equations in simply connected domains of the complex plane with continuous boundary data. We prove the existence of the weak solutions in the class if a Jordan domain satisfies the quasihyperbolic boundary condition by Gehring--Martio. An example of such a domain that fails to satisfy the standard (A)--condition by Ladyzhenskaya--Ural'tseva and the known outer cone condition is given. We also extend our results to simply connected non-Jordan domains formulated in terms of the prime ends by Caratheodory. Our approach is based on the theory of the logarithmic potential, singular integrals, the Leray--Schauder technique and a factorization theorem in \cite{GNR2017}. This theorem allows us to represent in the form where stands for a quasiconformal mapping of onto the unit disk , generated by the measurable matrix function and is a solution of the corresponding quasilinear Poisson equation in the unit disk . In the end, we give some applications of these results to various processes of diffusion and absorption in anisotropic and inhomogeneous media.
Cite
@article{arxiv.1804.05875,
title = {The Dirichlet problem for semi-linear equations},
author = {Vladimir Gutlyanskii and Olga Nesmelova and Vladimir Ryazanov},
journal= {arXiv preprint arXiv:1804.05875},
year = {2019}
}
Comments
30 pages