English

Morrey-Lorentz estimates for Hodge-type systems

Analysis of PDEs 2025-04-02 v1

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 νω \nu\wedge \omega and νd(Bω)\nu\wedge d^{\ast} \left( B\omega \right) or νBω\nu\lrcorner B\omega and ν(Adω)\nu\lrcorner \left( A d\omega \right) prescribed on Ω.\partial\Omega. We derive these estimates from the LpL^{p} 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 LpL^{p} 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.

Keywords

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}
}
R2 v1 2026-06-28T15:35:15.408Z