Bergman and Calder\'on projectors for Dirac operators

Abstract

For a Dirac operator Dg over a spin compact Riemannian manifold with boundary (X,g), we give a natural construction of the Calder\'on projector and of the associated Bergman projector on the space of harmonic spinors on X, and we analyze their Schwartz kernels. Our approach is based on the conformal covariance of Dg and the scattering theory for the Dirac operator associated to the complete conformal metric g=g/2 where is a smooth function on X which equals the distance to the boundary near ∂X. We show that ( Id+S(0))/2 is the orthogonal Calder\'on projector, where S(λ) is the holomorphic family in \(λ)≥ 0\ of normalized scattering operators constructed in our previous work, which are classical pseudo-differential of order 2λ. Finally we construct natural conformally covariant odd powers of the Dirac operator on any spin manifold.