Algebraic constructions for Jacobi-Jordan algebras

Abstract

For a given Jacobi-Jordan algebra A and a vector space V over a field k, a non-abelian cohomological type object H2A \, (V, \, A) is constructed: it classifies all Jacobi-Jordan algebras containing A as a subalgebra of codimension equal to dimk (V). Any such algebra is isomorphic to a so-called unified product A \, \, V. Furthermore, we introduce the bicrossed (semi-direct, crossed, or skew crossed) product A V associated to two Jacobi-Jordan algebras as a special case of the unified product. Several examples and applications are provided: the Galois group of the extension A ⊂eq A V is described as a subgroup of the semidirect product of groups GLk (V) Homk (V, \, A) and an Artin type theorem for Jacobi-Jordan algebra is proven. The key tools for classifying supersolvable and flag Jacobi-Jordan algebras are introduced.