Universal constructions for Poisson algebras. Applications
Abstract
We introduce the \emph{universal algebra} of two Poisson algebras and as a commutative algebra satisfying a certain universal property. The universal algebra is shown to exist for any finite dimensional Poisson algebra and several of its applications are highlighted. For any Poisson -module , we construct a functor from the category of -modules to the category of Poisson -modules which has a left adjoint whenever is finite dimensional. Similarly, if is an -module, then there exists another functor connecting the categories of Poisson representations of and and the latter functor also admits a left adjoint if is finite dimensional. If is -dimensional, then is the initial object in the category of all commutative bialgebras coacting on . As an algebra, can be deescribed as the quotient of the polynomial algebra through an ideal generated by non-homogeneous polynomials of degree . Two applications are provided. The first one describes the automorphisms group as the group of all invertible group-like elements of the finite dual . Secondly, we show that for an abelian group , all -gradings on can be explicitly described and classified in terms of the universal coacting bialgebra .
Cite
@article{arxiv.2301.03807,
title = {Universal constructions for Poisson algebras. Applications},
author = {A. L. Agore and G. Militaru},
journal= {arXiv preprint arXiv:2301.03807},
year = {2023}
}
Comments
Continues arXiv:2006.00711, arXiv:2301.03051