Christian Baer, Sebastian Hannes
Published 2017-04-11Version 1
On a compact globally hyperbolic Lorentzian spin manifold with smooth spacelike Cauchy boundary the (hyperbolic) Dirac operator is known to be Fredholm when Atiyah-Patodi-Singer boundary conditions are imposed. In this paper we investigate to what extent these boundary conditions can be replaced by more general ones and how the index then changes. There are some differences to the classical case of the elliptic Dirac operator on a Riemannian manifold with boundary.
Perturbations of APS boundary conditions for Lorentzian Dirac operators
Guide to Boundary Value Problems for Dirac-Type Operators
Addendum: the case of closed surfaces. (Boundary Value Problems on Planar Graphs and Flat Surfaces with integer cone singularities, I: The Dirichlet Problem)
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