Square Roots of Elliptic Systems in Locally Uniform Domains

Research output: Book/ReportBookProfessional

Abstract

This book establishes a comprehensive theory to treat square roots of elliptic systems incorporating mixed boundary conditions under minimal geometric assumptions. To lay the groundwork, the text begins by introducing the geometry of locally uniform domains and establishes theory for function spaces on locally uniform domains, including interpolation theory and extension operators. In these introductory parts, fundamental knowledge on function spaces, interpolation theory and geometric measure theory and fractional dimensions are recalled, making the main content of the book easier to comprehend. The centerpiece of the book is the solution to Kato's square root problem on locally uniform domains. The Kato result is complemented by corresponding Lp bounds in natural intervals of integrability parameters.
This book will be useful to researchers in harmonic analysis, functional analysis and related areas
Original languageEnglish
PublisherBirkhäuser Cham
Number of pages188
Edition1
ISBN (Electronic)978-3-031-63768-1
ISBN (Print)978-3-031-63767-4
DOIs
Publication statusPublished - 2024

Publication series

NamePart of the book series: Operator Theory: Advances and Applications (OT)
PublisherBirkhäuser Cham
Volume 303

Keywords

  • Mixed Boundary Conditions
  • Function Spaces
  • Extension Operators
  • Hardy's Inequality
  • Riesz Transforms
  • Fractional Laplacian
  • Functional Calculus
  • Sobolev Spaces
  • Interpolation Theory

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