On para-K\"ahler Lie algebroids and generalized pseudo-Hessian structures

Abstract

In this paper, we generalize all the results obtained on para-K\"ahler Lie algebras in Journal of Algebra 436 (2015) 61-101 to para-K\"ahler Lie algebroids. In particular, we study exact para-K\"ahler Lie algebroids as a generalization of exact para-K\"ahler Lie algebras. This study leads to a natural generalization of pseudo-Hessian manifolds. Generalized pseudo-Hessian manifolds have many similarities with Poisson manifolds. We explore these similarities which, among others, leads to a powerful machinery to build examples of non trivial pseudo-Hessian structures. Namely, we will show that given a finite dimensional commutative and associative algebra (A,.), the orbits of the action of (A,+) on A* given by (a,μ)=(La*)(μ) are pseudo-Hessian manifolds, where La(b)=a.b. We illustrate this result by considering many examples of associative commutative algebras an show that the pseudo-Hessian manifolds obtained are very interesting.