On the spectrum of differential operators under Riemannian coverings

Abstract

For a Riemannian covering p M2 M1, we compare the spectrum of an essentially self-adjoint differential operator D1 on a bundle E1 M1 with the spectrum of its lift D2 on p*E1 M2. We prove that if the covering is infinite sheeted and amenable, then the spectrum of D1 is contained in the essential spectrum of any self-adjoint extension of D2. We show that if the deck transformations group of the covering is infinite and D2 is essentially self-adjoint (or symmetric and bounded from below), then D2 (or the Friedrichs extension of D2) does not have eigenvalues of finite multiplicity and in particular, its spectrum is essential. Moreover, we prove that if M1 is closed, then p is amenable if and only if it preserves the bottom of the spectrum of some/any Schr\"odinger operator, extending a result due to Brooks.