Poisson Dialgebras
Abstract
The notion of Poisson dialgebras was introduced by Loday. In this article, we propose a new definition with some modifications that is supported by several canonical examples coming from Poisson algebra modules, averaging operators on Poisson algebras, and differential Poisson algebras. We show that a Poisson object in the category of linear maps has an associated Poisson dialgebra structure. Conversely, starting from a Poisson dialgebra we describe a Poisson object in the category of linear maps. These constructions yield a pair of adjoint functors between the category of Poisson objects in the category of linear maps and the category of Poisson dialgebras. There is a Lie 2-algebra associated with any Leibniz algebra. Here, we first obtain an associative 2-algebra starting from a dialgebra. Then, for a Poisson dialgebra, we construct a graded space that inherits both a Lie 2-algebra and an associative 2-algebra structure. In a particular case of Poisson dialgebras, which we call `reduced Poisson dialgebra', we obtain an associated 2-term homotopy Poisson algebra (of degree 0).
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