Strong representation equivalence for compact symmetric spaces of real rank one

Abstract

Let G/K be a simply connected compact irreducible symmetric space of real rank one. For each K-type τ we compare the notions of τ-representation equivalence with τ-isospectrality. We exhibit infinitely many K-types τ so that, for arbitrary discrete subgroups and ' of G, if the multiplicities of λ in the spectra of the Laplace operators acting on sections of the induced τ-vector bundles over G/K and ' G/K agree for all but finitely many λ, then and ' are τ-representation equivalent in G (i.e.\ HomG(Vπ, L2( G))= HomG(Vπ, L2(' G)) for all π∈ G satisfying HomK(Vτ,Vπ)≠0). In particular G/K and ' G/K are τ-isospectral (i.e.\ the multiplicities agree for all λ). We specially study the case of p-form representations, i.e. the irreducible subrepresentations τ of the representation τp of K on the p-exterior power of the complexified cotangent bundle p T C*M. We show that for such τ, in most cases τ-isospectrality implies τ-representation equivalence. We construct an explicit counter-example for G/K= SO(4n)/ SO(4n-1) S4n-1.