English

The $L^p$ regularity problem for parabolic operators

Analysis of PDEs 2026-04-28 v4 Classical Analysis and ODEs

Abstract

In this paper, we fully resolve the question of whether the Regularity problem for the parabolic PDE tu+\mboxdiv(Au)=0-\partial_tu + \mbox{div}(A\nabla u)=0 on a Lipschitz cylinder O×R\mathcal O\times\mathbb R is solvable for some p(1,)p\in (1,\infty) under the assumption that the matrix AA is elliptic, has bounded and measurable coefficients and its coefficients satisfy a natural Carleson condition (a parabolic analog of the so-called DKP-condition). We prove that for some p0>1p_0>1 the Regularity problem is solvable in the range (1,p0)(1,p_0). We note that answer to this question was not known even in the small Carleson case, that is, when the Carleson norm of coefficients is sufficiently small. In the elliptic case the analogous question was only fully resolved recently independently by two groups, with two very different methods: one involving two of the authors and S. Hofmann, the second by M. Mourgoglou, B. Poggi and X. Tolsa. Our approach in the parabolic case is motivated by that of the first group, but in the parabolic setting there are significant new challenges.

Keywords

Cite

@article{arxiv.2410.23801,
  title  = {The $L^p$ regularity problem for parabolic operators},
  author = {Martin Dindoš and Linhan Li and Jill Pipher},
  journal= {arXiv preprint arXiv:2410.23801},
  year   = {2026}
}

Comments

112 pages and 2 figures, to appear in Archive for Rational Mechanics and Analysis

R2 v1 2026-06-28T19:42:42.473Z