Boundary value problems and Hardy spaces for elliptic systems with block structure
Abstract
For elliptic systems with block structure in the upper half-space and t-independent coefficients, we settle the study of boundary value problems by proving compatible well-posedness of Dirichlet, regularity and Neumann problems in optimal ranges of exponents. Prior to this work, only the two-dimensional situation was fully understood. In higher dimensions, partial results for existence in smaller ranges of exponents and for a subclass of such systems had been established. The presented uniqueness results are completely new. We also elucidate optimal ranges for problems with fractional regularity data. Methods use and improve, with some new results, all the machinery developed over the last two decades to study such problems: the Kato square root estimates and Riesz transforms, Hardy spaces associated to operators, off-diagonal estimates, non-tangential estimates and square functions and abstract layer potentials to replace fundamental solutions in the absence of local regularity of solutions. This self-contained monograph provides a comprehensive overview on the field and unifies many earlier results that have been obtained by a variety of methods.
Cite
@article{arxiv.2012.02448,
title = {Boundary value problems and Hardy spaces for elliptic systems with block structure},
author = {Pascal Auscher and Moritz Egert},
journal= {arXiv preprint arXiv:2012.02448},
year = {2024}
}
Comments
This is a preprint of the following work: P. Auscher and M. Egert, Boundary value problems and Hardy spaces for elliptic systems with block structure, 2023, Birkh\"auser reproduced with permission of Birkh\"auser. The final authenticated version is available online at: https://doi.org/10.1007/978-3-031-29973-5. We have corrected and clarified the statements of Propositions 8.28 and 8.31