Dirac operators with W1,∞ -potential on collapsing sequences losing one dimension in the limit

Autoren: Saskia Roos (2018)

We study the behavior of the spectrum of the Dirac operator together with a symmetric W1,∞-potential on a collapsing sequence of spin manifolds with bounded sectional curvature and diameter losing one dimension in the limit. If there is an induced spin or pin structure on the limit space N, then there are eigenvalues that converge to the spectrum of a first order differential operator D on N together with a symmetric W1,∞-potential. In the case of an orientable limit space N, D is the spin Dirac operator DN on N if the dimension of the limit space is even and if the dimension of the limit space is odd, then D=DN⊕−DN.

Zeitschrift:
Manuscripta Mathematica
Verlag:
Springer
Seiten:
1-24

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