Cyclic Homology of Fukaya Categories and the Linearized Contact Homology
Abstract
Let M be an exact symplectic manifold with contact type boundary such that c1(M)=0. In this paper we show that the cyclic cohomology of the Fukaya category of M has the structure of an involutive Lie bialgebra. Inspired by a work of Cieliebak-Latschev we show that there is a Lie bialgebra homomorphism from the linearized contact homology of M to the cyclic cohomology of the Fukaya category. Our study is also motivated by string topology and 2-dimensional topological conformal field theory.
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