Kontsevich graphs act on Nambu-Poisson brackets, III. Uniqueness aspects

Abstract

Kontsevich constructed a map between `good' graph cocycles γ and infinitesimal deformations of Poisson bivectors on affine manifolds, that is, Poisson cocycles in the second Lichnerowicz--Poisson cohomology. For the tetrahedral graph cocycle γ3 and for the class of Nambu-determinant Poisson bivectors P over R2, R3 and R4, we know the fact of trivialization, P=[[ P, Xγ3dim]], by using dimension-dependent vector fields Xγ3dim expressed by Kontsevich (micro-) graphs. We establish that these trivializing vector fields Xγ3dim are unique modulo Hamiltonian vector fields XH=dP(H)= [[ P, H]], where dP is the Lichnerowicz--Poisson differential and where the Hamiltonians H are also represented by Kontsevich (micro-)graphs. However, we find that the choice of Kontsevich (micro-)graphs to represent the aforementioned multivectors is not unique.