The homotopy invariance of the string topology loop product and string bracket

Abstract

Let M be a closed, oriented, n -manifold, and LM its free loop space. Chas and Sullivan defined a commutative algebra structure in the homology of LM, and a Lie algebra structure in its equivariant homology. These structures are known as the string topology loop product and string bracket, respectively. In this paper we prove that these structures are homotopy invariants in the following sense. Let f : M1 M2 be a homotopy equivalence of closed, oriented n -manifolds. Then the induced equivalence, Lf : LM1 LM2 induces a ring isomorphism in homology, and an isomorphism of Lie algebras in equivariant homology. The analogous statement also holds true for any generalized homology theory h* that supports an orientation of the Mi 's.

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