Resumen de Operations on the de Rham cohomology of Poisson and Jacobi manifolds
Ai Guan, Fernando Muro Jiménez 
We prove that the (homotopy) hypercommutative algebra structure on the de Rham cohomology of a Poisson or Jacobi manifold defined by several authors is (homotopically) trivial, i.e. it reduces to the underlying (homotopy) commutative algebra structure. We do so by showing that the DG operads which codify the algebraic structure on the de Rham complex of Poisson and Jacobi manifolds, generated by the exterior product and the interior products with the structure polyvector fields, are quasi-isomorphic to the commutative suboperad. We proceed similarly with the commutative BV∞-algebra structure on the de Rham complex of a generalized Poisson supermanifold.
