A partitioned manifold index theorem for noncompact hypersurfaces

Abstract

Roe's partitioned manifold index theorem applies when a complete Riemannian manifold M is cut into two pieces along a compact hypersurface N. It states that a version of the index of a Dirac operator on M localized to N equals the index of the corresponding Dirac operator on N. This yields obstructions to positive scalar curvature, and implies cobordism invariance of the index of Dirac operators on compact manifolds. We generalize this result to cases where N may be noncompact, under assumptions on the way it is embedded into M. This results in an equality between two classes in the K-theory of the Roe algebra of N. Bunke and Ludewig, and Engel and Wulff, have recently obtained related results based on different approaches.