The Calder\'on Projector for Fibred Cusp Operators

Abstract

A Calder\'on projector for an elliptic operator P on a manifold with boundary X is a projection from general boundary data to the set of boundary data of solutions u of Pu=0. Seeley proved in 1966 that for compact X and for P uniformly elliptic up to the boundary there is a Calder\'on projector which is a pseudodifferential operator on ∂ X. We generalize this result to the setting of fibred cusp operators, a class of elliptic operators on certain non-compact manifolds having a special fibred structure at infinity. This applies, for example, to the Laplacian on certain locally symmetric spaces or on particular singular spaces, such as a domain with cusp singularity or the complement of two touching smooth strictly convex domains in Euclidean space. Our main technical tool is the φ-pseudodifferential calculus introduced by Mazzeo and Melrose. In our presentation we provide a setting that may be useful for doing analogous constructions for other types of singularities.