A Remark on the First Eigenvalue of the Laplace Operator on 1-forms for Compact Inner Symmetric Spaces
Abstract
We remark that on a compact inner symmetric space G/K, indowed with the Riemmannian metric given by the Killing form of G signed-changed, the first (non-zero) eigenvalue of the Laplace operator on 1-forms is the Casimir eigenvalue of the highest either long or short root of G, according as the highest weight of the isotropy representation is long or short. Some results for the first (non-zero) eigenvalue on functions are derived. This is a revision of the first version of the preprint: a non correct statement about the spectrum on functions has been reviewed.
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