Higher string topology on general spaces
Abstract
In this paper, I give a generalized analogue of the string topology results of Chas and Sullivan, and of Cohen and Jones. For a finite simplicial complex X and k ≥ 1, I construct a spectrum Maps(Sk, X)S(X), and show that the corresponding chain complex is naturally homotopy equivalent to an algebra over the (k+1)-dimensional unframed little disk operad Ck+1. I also prove Kontsevich's conjecture that the Quillen cohomology of a based Ck-algebra (in the category of chain complexes) is equivalent to a shift of its Hochschild cohomology, as well as prove that the operad CCk is Koszul-dual to itself up to a shift in the derived category. This gives one a natural notion of (derived) Koszul dual CCk-algebras. I show that the cochain complex of X and the chain complex of k X are Koszul dual to each other as CCk-algebras, and that the chain complex of Maps(Sk, X)S(X) is naturally equivalent to their (equivalent) Hochschild cohomology in the category of CCk-algebras.
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