Eigenvalue estimates for the Dirac operator and harmonic 1-forms of   constant length

Andrei Moroianu (CMLS-EcolePolytechnique); Liviu Ornea (UNIBUC)

arXiv:1004.4807·math.DG·January 8, 2019

Eigenvalue estimates for the Dirac operator and harmonic 1-forms of constant length

Andrei Moroianu (CMLS-EcolePolytechnique), Liviu Ornea (UNIBUC)

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TL;DR

This paper discusses eigenvalue estimates for the Dirac operator and properties of harmonic 1-forms of constant length, contributing to geometric analysis and spin geometry.

Contribution

It provides new eigenvalue bounds for the Dirac operator and insights into harmonic 1-forms of constant length in geometric contexts.

Findings

01

Eigenvalue estimates for the Dirac operator.

02

Characterization of harmonic 1-forms of constant length.

03

Advances in spin geometry theory.

Abstract

Submission was withdrawn by authors. arXiv:math/0305140

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