Dirac operator on spinors and diffeomorphisms

Abstract

The issue of general covariance of spinors and related objects is reconsidered. Given an oriented manifold M, to each spin structure σ and Riemannian metric g there is associated a space Sσ, g of spinor fields on M and a Hilbert space σ, g= L2(Sσ, g,Mg) of L2-spinors of Sσ, g. The group M of orientation-preserving diffeomorphisms of M acts both on g (by pullback) and on [σ] (by a suitably defined pullback f*σ). Any f∈ M lifts in exactly two ways to a unitary operator U from σ, g to f*σ,f*g. The canonically defined Dirac operator is shown to be equivariant with respect to the action of U, so in particular its spectrum is invariant under the diffeomorphisms.