Graded Poisson algebras on bordism groups of garlands

Abstract

Let M be an oriented manifold and let N be a set consisting of oriented closed manifolds of the same odd dimension. We consider the topological space G N, M of commutative diagrams. Each commutative diagram consists of a few manifolds from N that are mapped to M and a few one point spaces pt that are each mapped to a pair of manifolds from N. We consider the oriented bordism group *(G N, M)=i=0∞ i(G N, M). We introduce the operations and [·, ·] on *(G N,M) Q, that make *(G N,M) Q into a graded Poisson algebra (Gerstenhaber-like algebra). For N=\S1\ and a surface M=F2, the subalgebra 0(G\S1\, F2) Q of our algebra is related to the Andersen-Mattes-Reshetikhin Poisson algebra of chord-diagrams.

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