We prove that the mass endomorphism associated to the Dirac operator on a
Riemannian manifold is non-zero for generic Riemannian metrics. The proof
involves a study of the mass endomorphism under surgery, its behavior near
metrics with harmonic spinors, and analytic perturbation arguments

Ammann, Bernd

Dahl, Mattias

Hermann, Andreas

Humbert, Emmanuel

Annales de l’institut Fourier

English

arXiv

Bernd Ammann

Mattias Dahl

Andreas Hermann

Emmanuel Humbert

Crossref

Mass endomorphism, surgery and perturbations

Numérisation de Documents Anciens Mathématiques

Mass endomorphism, surgery and perturbations

Annales de l’institut Fourier (AIF)

We prove that the mass endomorphism associated to the Dirac operator on a Riemannian manifold is non-zero for generic Riemannian metrics. The proof involves a study of the mass endomorphism under surgery, its behavior near metrics with harmonic spinors, and analytic perturbation arguments

University of Regensburg Publication Server

We prove that the mass endomorphism associated to the Dirac operator on a Riemannian manifold is non-zero for generic Riemannian metrics. The proof involves a study of the mass endomorphism under surgery, its behavior near metrics with harmonic spinors, and analytic perturbation arguments.</p

Dahl, Mattias,

Swepub

International audienceWe prove that the mass endomorphism associated to the Dirac operator on a Riemannian manifold is non-zero for generic Riemannian metrics. The proof involves a study of the mass endomorphism under surgery, its behavior near metrics with harmonic spinors, and analytic perturbation arguments

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0 MASS ENDOMORPHISM, SURGERY AND PERTURBATIONS

Mass endomorphism, surgery and perturbations

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