Universal cocycles and the graph complex action on homogeneous Poisson brackets by diffeomorphisms

Abstract

The graph complex acts on the spaces of Poisson bi-vectors P by infinitesimal symmetries. We prove that whenever a Poisson structure is homogeneous, i.e. P = LV(P) w.r.t. the Lie derivative along some vector field V, but not quadratic (the coefficients of P are not degree-two homogeneous polynomials), and whenever its velocity bi-vector P=Q(P), also homogeneous w.r.t. V by LV(Q)=n· Q whenever Q(P)= Or(γ)(P^n) is obtained using the orientation morphism Or from a graph cocycle γ on n vertices and 2n-2 edges in each term, then the 1-vector X=Or(γ)(V P^n-1) is a Poisson cocycle. Its construction is uniform for all Poisson bi-vectors P satisfying the above assumptions, on all finite-dimensional affine manifolds M. Still, if the bi-vector Q 0 is exact in the respective Poisson cohomology, so there exists a vector field Y such that Q(P)=[\![Y,P]\!], then the universal cocycle X does not belong to the coset of Y mod [\![P,·]\!]. We illustrate the construction using two examples of cubic-coefficient Poisson brackets associated with the R-matrices for the Lie algebra gl(2). Keywords: Graph complex, Poisson bracket, deformation cohomology, affine manifold, tetrahedral flow, diffeomorphism.