Quantum-classical correspondence on associated vector bundles over locally symmetric spaces

Abstract

For a compact Riemannian locally symmetric space M of rank one and an associated vector bundle Vτ over the unit cosphere bundle S M, we give a precise description of those classical (Pollicott-Ruelle) resonant states on Vτ that vanish under covariant derivatives in the Anosov-unstable directions of the chaotic geodesic flow on S M. In particular, we show that they are isomorphically mapped by natural pushforwards into generalized common eigenspaces of the algebra of invariant differential operators D(G,σ) on compatible associated vector bundles Wσ over M. As a consequence of this description, we obtain an exact band structure of the Pollicott-Ruelle spectrum. Further, under some mild assumptions on the representations τ and σ defining the bundles Vτ and Wσ, we obtain a very explicit description of the generalized common eigenspaces. This allows us to relate classical Pollicott-Ruelle resonances to quantum eigenvalues of a Laplacian in a suitable Hilbert space of sections of Wσ. Our methods of proof are based on representation theory and Lie theory.