English

Higher Order Elliptic Equations on Nonsmooth Domains

Analysis of PDEs 2025-02-14 v1

Abstract

In 1995, D. Jerison and C. Kenig in \cite{JK-1995} considered the the inhomogeneous Dirichlet problem Δu=f\Delta u= f on Ω\Omega, u=0u=0 on Ω\partial\Omega in Lipschitz domains. One of their main results shows that the W1,pW^{1,p} estimate holds for the sharp range 32ε<p<3+ε\frac{3}{2}-\varepsilon<p<3+\varepsilon for d3d\geq 3 and 43ε<p<4+ε\frac{4}{3}-\varepsilon<p<4+\varepsilon if d=2d=2. Although the argument employed in \cite{JK-1995} yields optimal results, they rely on an essential fashion on the maximum principle and, as such, do not readily adapt to higher-order case. By using a new method, the aim of this paper is to establish an extension of their theorem for higher order inhomogeneous elliptic equations on bounded Lipschitz and convex domains, uniform W,pW^{\ell,p} estimates are obtained for pp in certain ranges. Especially, compare to the result in \cite{MM-2013} for biharmonic equation, a larger, sharp, range of psp's was obtained in this paper.

Keywords

Cite

@article{arxiv.2502.09339,
  title  = {Higher Order Elliptic Equations on Nonsmooth Domains},
  author = {Jun Geng},
  journal= {arXiv preprint arXiv:2502.09339},
  year   = {2025}
}
R2 v1 2026-06-28T21:43:09.952Z