Weitzenb\"ock Remainder Spectrum on Rational Homogeneous Varieties
Abstract
In this paper, we precisely describe the spectrum of closed invariant (1,1)-forms viewed as an operator acting on complex spinor bundles over rational homogeneous varieties. Using this result, we describe the spectrum of the Weitzenb\"ock remainder of Spinc Dirac operators on rational homogeneous varieties. In particular, we present an explicit formula for their smallest eigenvalue. As a byproduct, we obtain a new lower bound for the eigenvalues of the Spinc Dirac operator, expressed in terms of Lie-theoretic data. Additionally, combining the Atiyah-Singer index theorem with the Borel-Weil-Bott theorem, we provide a complete classification of Spinc structures on rational homogeneous varieties which admit harmonic spinors. In this last setting, we present an explicit formula for the index of the associated Spinc Dirac operator in terms of Lie theory.
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