Morrey-Lorentz estimates for Hodge-type systems
Abstract
We prove up to the boundary regularity estimates in Morrey-Lorentz spaces for weak solutions of the linear system of differential forms with regular anisotropic coefficients \begin{equation*} d^{\ast} \left( A d\omega \right) + B^{\intercal}d d^{\ast} \left( B\omega \right) = \lambda B\omega + f \text{ in } \Omega, \end{equation*} with either and or and prescribed on We derive these estimates from the estimates obtained in \cite{Sil_linearregularity} in the spirit of Campanato's method. Unlike Lorentz spaces, Morrey spaces are neither interpolation spaces nor rearrangement invariant. So Morrey estimates can not be obtained directly from the estimates using interpolation. We instead adapt an idea of Lieberman \cite{Lieberman_morrey_from_Lp} to our setting to derive the estimates. Applications to Hodge decomposition in Morrey-Lorentz spaces, Gaffney type inequalities and estimates for related systems such as Hodge-Maxwell systems and `div-curl' systems are discussed.
Cite
@article{arxiv.2403.18387,
title = {Morrey-Lorentz estimates for Hodge-type systems},
author = {Banhirup Sengupta and Swarnendu Sil},
journal= {arXiv preprint arXiv:2403.18387},
year = {2025}
}