Spectrally distinguishing symmetric spaces II
Abstract
The action of the subgroup G2 of SO(7) (resp.\ Spin(7) of SO(8)) on the Grassmannian space M=SO(7)SO(5)×SO(2) (resp.\ M=SO(8)SO(5)×SO(3)) is still transitive. We prove that the spectrum (i.e.\ the collection of eigenvalues of its Laplace-Beltrami operator) of a symmetric metric g0 on M coincides with the spectrum of a G2-invariant (resp.\ Spin(7)-invariant) metric g on M only if g0 and g are isometric. As a consequence, each non-flat compact irreducible symmetric space of non-group type is spectrally unique among the family of all currently known homogeneous metrics on its underlying differentiable manifold.
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