Graded Lie agebroids of Poisson almost commutative algebras (Q1701130)

This paper introduces and studies the notion of abelian groups graded Lie algebroid structures on almost commutative algebras. In a previous work, the author introduced the notion of Poisson almost commutative algebra (PACA). In this work, the author first answers the natural question to find which classical geometric objects on Poisson manifold have their equivalents in the framework of PACA. Then the author recalls the notions of graded Schouten-Nijenhuis structure and graded Poisson bracket. He shows that any graded Poisson bracket induces a graded Lie algebroid. The corresponding Poisson cohomology is studied. Moreover, the author explicitly computes the Poisson cohomology of the quantum plane.