A Double Poisson Algebra Structure on Fukaya Categories
Abstract
Let M be an exact symplectic manifold with c1(M)=0. Denote by Fuk(M) the Fukaya category of M. We show that the dual space of the bar construction of Fuk(M) has a differential graded noncommutative Poisson structure. As a corollary we get a Lie algebra structure on the cyclic cohomology HC(Fuk(M)), which is analogous to the ones discovered by Kontsevich in noncommutative symplectic geometry and by Chas and Sullivan in string topology.
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