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The Hochschild cohomology of a closed manifold

Authors:	Yves Felix Jean-Claude Thomas and Micheline Vigué-Poirrier

Institution:	(1) Département de mathématique, Université Catholique de Louvain, 2, Chemin du Cyclotron, 1348 Louvain la Neuve, Belgium;(2) Département de mathématique, Université dAngers, 2, Boulevard Lavoisier, 49045 Angers, France;(3) Institut Galilée, Université de Paris-Nord, 93430 Villetaneuse, France

Abstract:	Let M be a closed orientable manifold of dimension d and $\mathcal{C}^(M)$ be the usual cochain algebra on M with coefficients in a field k. The Hochschild cohomology of M, $H\!H^(\mathcal{C}^(M);\mathcal{C}^(M))$ is a graded commutative and associative algebra. The augmentation map $\varepsilon: \mathcal{C}^(M) \to{\textbf{\textit{k}}}$ induces a morphism of algebras $I : H\!H^(\mathcal{C}^(M);\mathcal{C}^(M)) \to{H\!H^(\mathcal{C}^(M);{\textbf{\textit{k}}})}$ . In this paper we produce a chain model for the morphism I. We show that the kernel of I is a nilpotent ideal and that the image of I is contained in the center of $H\!H^(\mathcal{C}^(M);{\textbf{\textit{k}}})$ , which is in general quite small. The algebra $H\!H^(\mathcal{C}^(M);\mathcal{C}^*(M))$ is expected to be isomorphic to the loop homology constructed by Chas and Sullivan. Thus our results would be translated in terms of string homology.

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