A Localization Theorem for Dirac operators

Manousos Maridakis

arXiv:2110.11654·math.DG·September 23, 2022

A Localization Theorem for Dirac operators

Manousos Maridakis

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TL;DR

This paper proves a localization theorem for solutions of perturbed Dirac operators on compact manifolds, showing they concentrate near the singular set of the perturbation as the parameter grows large.

Contribution

It establishes a spectral separation property and an index localization theorem for perturbed Dirac operators under a specific algebraic criterion.

Findings

01

Solutions concentrate near the singular set as s→∞

02

Spectral separation of deformed Laplacians for large s

03

Proved an index localization theorem

Abstract

We study perturbed Dirac operators of the form $D_{s} = D + s \A : Γ (E^{0}) \to Γ (E^{1})$ over a compact Riemannian manifold $(X, g)$ with symbol $c$ and special bundle maps $\A : E^{0} \to E^{1}$ for $s >> 0$ . Under a simple algebraic criterion on the pair $(c, \A)$ , solutions of $D_{s} ψ = 0$ concentrate as $s \to \infty$ around the singular set $Z_{\A}$ of $\A$ . We prove a spectral separation property of the deformed Laplacians $D_{s}^{*} D_{s}$ and $D_{s} D_{s}^{*}$ , for $s >> 0$ . As a corollary we prove an index localization theorem.

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Taxonomy

TopicsSpectral Theory in Mathematical Physics · Quantum chaos and dynamical systems · Advanced Operator Algebra Research