Cyclic pairings and derived Poisson structures
Abstract
There is a canonical derived Poisson structure on the universal enveloping algebra Ua of a (DG) Lie algebra a that is Koszul dual to a cyclic cocommutative (DG) coalgebra. Interesting special cases of this derived Poisson structure include (an analog of) the Chas-Sullivan bracket on string topology. We study how certain derived character of a intertwine this derived Poisson structure with the induced Poisson structure on the representation homology of a. In addition, we obtain an analog of one of our main results for associative algebras.
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