Sharp Morrey regularity theory for a fourth order geometrical equation
Analysis of PDEs
2023-05-08 v1
Abstract
This paper is a continuation of the recent work of Guo-Xiang-Zheng \cite{Guo-Xiang-Zheng-2021-CV}. We deduce sharp Morrey regularity theory for weak solutions to the fourth order nonhomogeneous Lamm-Rivi\`ere equation \begin{equation*} \Delta^{2}u=\Delta(V\nabla u)+div(w\nabla u)+(\nabla\omega+F)\cdot\nabla u+f\qquad\text{in }B^{4},\end{equation*} under smallest regularity assumptions of and that belongs to some Morrey spaces, which was motivated by many geometrical problems such as the flow of biharmonic mappings. Our results deepens the type regularity theory of \cite{Guo-Xiang-Zheng-2021-CV}, and generalizes the work of Du, Kang and Wang \cite{Du-Kang-Wang-2022} on a second order problem to our fourth order problems.
Cite
@article{arxiv.2305.03349,
title = {Sharp Morrey regularity theory for a fourth order geometrical equation},
author = {Chang-Lin Xiang and Gao-Feng Zheng},
journal= {arXiv preprint arXiv:2305.03349},
year = {2023}
}