On the multiplicity of eigenvalues of conformally covariant operators

Abstract

Let (M,g) be a compact Riemannian manifold and Pg an elliptic, formally self-adjoint, conformally covariant operator of order m acting on smooth sections of a bundle over M. We prove that if Pg has no rigid eigenspaces (see Definition 2.2), the set of functions f ∈ C∞(M, R) for which Pefg has only simple non-zero eigenvalues is a residual set in C∞(M,R). As a consequence we prove that if Pg has no rigid eigenspaces for a dense set of metrics, then all non-zero eigenvalues are simple for a residual set of metrics in the Cm-topology. We also prove that the eigenvalues of Pg depend continuously on g in the Cm-topology, provided Pg is strongly elliptic. As an application of our work, we show that if Pg acts on C∞(M) (e.g. GJMS operators), its non-zero eigenvalues are generically simple.