English

Maximal regularity estimates for the abstract Cauchy problems

Analysis of PDEs 2025-02-25 v1 Functional Analysis

Abstract

In this work, we extend the Da Prato-Grisvard theory of maximal regularity estimates for sectorial operators in interpolation spaces. Specifically, for any generator A-A of an analytic semigroup on a Banach space XX, we identify the interpolation spaces between XX and the domain DAD_{A} of AA in which the part of AA satisfies certain maximal regularity estimates. We also establish several new results concerning both homogeneous and inhomogeneous L1L^1-maximal regularity estimates, extending and completing recent findings in the literature. These results are motivated not only by applications to problems in areas such as fluid mechanics but also by the intrinsic theoretical interest of the subject. In particular, we address the optimal choice of data spaces for the Cauchy problem associated with AA, ensuring the existence of strong solutions with global-in-time control of their derivatives. This control is measured via the homogeneous parts of the interpolation norms in the spatial variable and weighted Lebesgue norms over the time interval. Furthermore, we characterize weighted L1L^1-estimates and establish their relationship with unweighted estimates. Additionally, we reformulate the characterization condition for L1L^1-maximal regularity due to Kalton and Portal in a priori terms that do not rely on semigroup operators. Finally, we introduce a new interpolation framework for LpL^p-maximal regularity estimates, where p(1,)p \in (1, \infty), within interpolation spaces generated by non-classical interpolation functors.

Keywords

Cite

@article{arxiv.2502.16521,
  title  = {Maximal regularity estimates for the abstract Cauchy problems},
  author = {Sebastian Król and Mieczysław Mastyło and Jarosław Sarnowski},
  journal= {arXiv preprint arXiv:2502.16521},
  year   = {2025}
}

Comments

64 pages

R2 v1 2026-06-28T21:54:28.894Z