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Lorentzian spectral geometry for globally hyperbolic surfaces

Finster, Felix and Müller, Olaf (2014) Lorentzian spectral geometry for globally hyperbolic surfaces. Preprintreihe der Fakultät Mathematik 19/2014, Working Paper.

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Date of publication of this fulltext: 27 Jun 2016 11:46

Abstract

The fermionic signature operator is analyzed on globally hyperbolic Lorentzian surfaces. The connection between the spectrum of the fermionic signature operator and geometric properties of the surface is studied. The findings are illustrated by simple examples and counterexamples.


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Item type:Monograph (Working Paper)
Series of the University of Regensburg:Preprintreihe der Fakultät Mathematik
Date:2014
Institutions:Mathematics > Prof. Dr. Felix Finster
Dewey Decimal Classification:500 Science > 510 Mathematics
Status:Unknown
Refereed:No, this version has not been refereed yet (as with preprints)
Created at the University of Regensburg:Yes
Item ID:33961
Owner only: item control page

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