The global extension problem, crossed products and co-flag non-commutative Poisson algebras

Abstract

Let P be a Poisson algebra, E a vector space and π : E P an epimorphism of vector spaces with V = Ker (π). The global extension problem asks for the classification of all Poisson algebra structures that can be defined on E such that π : E P becomes a morphism of Poisson algebras. From a geometrical point of view it means to decompose this groupoid into connected components and to indicate a point in each such component. All such Poisson algebra structures on E are classified by an explicitly constructed classifying set G P H2 \, (P, \, V) which is the coproduct of all non-abelian cohomological objects P H2 \, (P, \, (V, ·V, [-,-]V)) which are the classifying sets for all extensions of P by (V, ·V, [-,-]V). The second classical Poisson cohomology group H2 (P, V) appears as the most elementary piece among all components of G P H2 \, (P, \, V). Several examples are provided in the case of metabelian Poisson algebras or co-flag Poisson algebras over P: the latter being Poisson algebras Q which admit a finite chain of epimorphisms of Poisson algebras Pn : = Q πn Pn-1 \, ·s \, P1 π1 P0 := P such that dim ( Ker (πi) ) = 1, for all i = 1, ·s, n.