Spectral Flow
A Functional Analytic and Index-Theoretic Approach
Author(s)
Doll, Nora
Schulz-Baldes, Hermann
Waterstraat, Nils
Language
EnglishAbstract
This is the first treatment entirely dedicated to an analytic study of spectral flow for paths of selfadjoint Fredholm operators, possibly unbounded or understood in a semi finite sense. The importance of spectral flow for homotopy and index theory are discussed in detail. Applications concern eta-invariants, the Bott-Maslov and Conley-Zehnder indices, Sturm-Liouville oscillation theory, the spectral localizer and bifurcation theory.
Keywords
Self-adjoint Fredholm operators; topologies; thereon Index; theory of Fredholm pairs; Bott-Maslov and Conley-Zehnder indices; Oscillation theory Jacobi operators; scattering theory; Variational bifurcation theoryDOI
10.1515/9783111172477ISBN
9783111172477, 9783111169897, 9783111173085, 9783111172477Publisher
De GruyterPublisher website
https://www.degruyter.com/Publication date and place
Berlin/Boston, 2023Imprint
De GruyterSeries
De Gruyter Studies in Mathematics, 94Classification
Differential calculus and equations
Numerical analysis
Applied mathematics