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

doi:10.1112/jtopol/jtn001

Journal of Topology 2008 1(2):391-408; doi:10.1112/jtopol/jtn001

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

Ralph L. Cohen

Department of Mathematics, Stanford University, Stanford, CA 94305, USA ralph@math.stanford.edu

John R. Klein

Department of Mathematics, Wayne State University, Detroit, MI 48202, USA klein@math.wayne.edu

Dennis Sullivan

Mathematics Department, SUNY, Stony Brook, NY 11794, USA dennis@math.sunysb.edu

Abstract

Let Mⁿ be a closed, oriented, n-manifold, and LM its free loopspace. In [Chas and Sullivan, ‘String topology’,Ann. of Math., to appear] a commutative algebra structure inhomology, H_*(LM), and a Lie algebra structure in equivarianthomology , were defined.In this paper, we prove that these structures are homotopy invariantsin the following sense. Let f:M₁ $->$ M₂ be a homotopy equivalenceof closed, oriented n-manifolds. Then the induced equivalence,Lf:LM₁ $->$ LM₂ induces a ring isomorphism in homology, and an isomorphismof Lie algebras in equivariant homology. The analogous statementalso holds true for any generalized homology theory h_* thatsupports an orientation of the M_i.

Received February 5, 2007.

2000 Mathematics Subject Classification 55N45, 55R80

All three authors were partially supported by grants from theNSF.

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