D-bialgebras, dendrification and embeddings into AWB of almost Poisson algebras

Abstract

An algebra with bracket ( AWB for short) is an associative algebra endowed with a bilinear bracket satisfying a Leibniz-type compatibility condition, as introduced in casas. It can be viewed as a noncommutative generalization of an almost Poisson algebra; indeed, when the associative product is commutative and the bracket is skew-symmetric, one recovers the notion of an almost Poisson algebra. In this paper, we introduce the notion of almost Poisson Drinfel'd bialgebras (D-bialgebras) as an analogue of Poisson D-bialgebras, and we establish the equivalence between matched pairs, Manin triples, and almost Poisson D-bialgebras. Furthermore, we define a new algebraic structure, called almost tridendriform Poisson algebras, which can be regarded as the underlying algebraic structures associated with relative Rota-Baxter operators on almost Poisson algebras. Finally, we show that every almost Poisson algebra can be embedded into an algebra with bracket ( AWB) via averaging operators, and more generally via relative averaging operators associated to a given representation of the almost Poisson algebra.

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