Oberwolfach Reports


Full-Text PDF (376 KB) | Introduction as PDF | Metadata | Table of Contents | OWR summary
Volume 9, Issue 1, 2012, pp. 43–76
DOI: 10.4171/OWR/2012/02

Published online: 2012-11-14

Mini-Workshop: Boundary Value Problems and Spectral Geometry

Jussi Behrndt[1], Konstantin Pankrashkin[2] and Olaf Post[3]

(1) TU Graz, Austria
(2) Université Paris-Sud, Orsay, France
(3) Universität Trier, Germany

Boundary value problems and spectral geometry is an attractive and rapidly developing area in modern mathematical analysis. The interaction of PDE methods with concepts from operator theory and differential geometry is particularly challenging and leads directly to new insights and applications in various branches of pure and applied mathematics, e.g., analysis on manifolds, global analysis and mathematical physics. Some recent contributions in the field of boundary value problems and spectral geometry concern, e.g., construction of isospectral manifolds with boundary, eigenvalue and resonance distribution for large energies, multidimensional inverse spectral problems, singular perturbations, new regularity techniques, Dirichletto-Neumann maps and Titchmarsh-Weyl functions.

No keywords available for this article.

Behrndt Jussi, Pankrashkin Konstantin, Post Olaf: Mini-Workshop: Boundary Value Problems and Spectral Geometry. Oberwolfach Rep. 9 (2012), 43-76. doi: 10.4171/OWR/2012/02