Open-closed field theories, string topology, and Hochschild homology

Abstract

In this expository paper we discuss a project regarding the string topology of a manifold, that was inspired by recent work of Moore-Segal, Costello, and Hopkins and Lurie, on "open-closed topological conformal field theories". Given a closed, oriented manifold M, we describe the "string topology category" SM, which is enriched over chain complexes over a fixed field k. The objects of SM are connected, closed, oriented submanifolds N of M, and the complex of morphisms between N1 and N2 is a chain complex homotopy equivalent to the singular chains C*(PN1, N2), where C*(PN1, N2) is the space of paths in M that start in N1 and end in N2. The composition pairing in this category is a chain model for the open string topology operations of Sullivan and expanded upon by Harrelson, and Ramirez. We will describe a calculation yielding that the Hochschild homology of the category SM is the homology of the free loop space, LM. Another part of the project is to calculate the Hochschild cohomology of the open string topology chain algebras C*(PN,N) when M is simply connected, and relate the resulting calculation to H*(LM). We also discuss a spectrum level analogue of the above results and calculations, as well as their relations to various Fukaya categories of the cotangent bundle T*M.