A relation between the Dirichlet and the Regularity problem for Parabolic equations
Abstract
We study the relationship between the Dirichlet and Regularity problem for parabolic operators of the form on cylindrical domains , where the base is a -sided chord arc domain (and for one result Lipschitz) in the spatial variables. In the paper we answer the question when the solvability of the Regularity problem for (denoted by ) can be deduced from the solvability of the Dirichlet problem for the adjoint operator (denoted ). We show that this holds if for at least of the problem is solvable. That is, we establish a duality/dichotomy result: Dirichlet solvability implies Regularity solvability in the dual range, or the Regularity problem is not solvable in any . Results like these were only known in the elliptic settings (Kenig-Pipher (1993) and Shen (2006)) but are new for parabolic PDEs. Our result is one of the key components needed for the recent advancement of Dindo\v{s}, Li and Pipher in understanding solvability of the Regularity problem for operators whose coefficients satisfy certain natural Carleson condition (called also DKP-condition in the elliptic case).
Keywords
Cite
@article{arxiv.2409.09197,
title = {A relation between the Dirichlet and the Regularity problem for Parabolic equations},
author = {Martin Dindoš and Erika Nyström},
journal= {arXiv preprint arXiv:2409.09197},
year = {2025}
}
Comments
no text changes but change of author's legal name