Van Den Bergh isomorphisms in String Topology

Abstract

Let M be a path-connected closed oriented d-dimensional smooth manifold and let be a principal ideal domain. By Chas and Sullivan, the shifted free loop space homology of M, H*+d(LM) is a Batalin-Vilkovisky algebra. Let G be a topological group such that M is a classifying space of G. Denote by S*(G) the (normalized) singular chains on G. Suppose that G is discrete or path-connected. We show that there is a Van Den Bergh type isomorphism HH-p(S*(G),S*(G)) HHp+d(S*(G),S*(G)). Therefore, the Gerstenhaber algebra HH*(S*(G),S*(G)) is a Batalin-Vilkovisky algebra and we have a linear isomorphism HH*(S*(G),S*(G)) H*+d(LM). This linear isomorphism is expected to be an isomorphism of Batalin-Vilkovisky algebras. We also give a new characterization of Batalin-Vilkovisky algebra in term of derived bracket.