Universal constructions for Poisson algebras. Applications

Abstract

We introduce the universal algebra of two Poisson algebras P and Q as a commutative algebra A:= P (P, \, Q ) satisfying a certain universal property. The universal algebra is shown to exist for any finite dimensional Poisson algebra P and several of its applications are highlighted. For any Poisson P-module U, we construct a functor U - A M Q P M from the category of A-modules to the category of Poisson Q-modules which has a left adjoint whenever U is finite dimensional. Similarly, if V is an A-module, then there exists another functor - V P P M Q P M connecting the categories of Poisson representations of P and Q and the latter functor also admits a left adjoint if V is finite dimensional. If P is n-dimensional, then P (P) := P (P, \, P) is the initial object in the category of all commutative bialgebras coacting on P. As an algebra, P (P) can be deescribed as the quotient of the polynomial algebra k[Xij \, | \, i, j = 1, ·s, n] through an ideal generated by 2 n3 non-homogeneous polynomials of degree ≤ 2. Two applications are provided. The first one describes the automorphisms group Aut Poiss (P) as the group of all invertible group-like elements of the finite dual P (P) o. Secondly, we show that for an abelian group G, all G-gradings on P can be explicitly described and classified in terms of the universal coacting bialgebra P (P).