Inverse semialgebras and partial actions of Lie algebras

Abstract

We introduce the concept of a non-associative (i.e. non-necessarily associtive) inverse semialgebra over a field, the Lie version of which is inspired by the set of all partially defined derivations of a non-associative algebra, whereas the associative case is based on such examples as the set of all partially defined linear maps of a vector space, the set of all sections of the structural sheaf of a scheme, the set of all regular functions defined on open subsets of an algebraic variety and the set of all smooth real valued functions defined on open subsets of a smooth manifold. Given a Lie algebra L we define the notion of a partial action of L on a non-associative algebra A as an appropriate premorphism and introduce a Lie inverse semialgebra E(L), which is a Lie analogue of R. Exel's inverse semigroup S(G) that governs the partial actions of a group G. We discuss how E(L) controls the premorphisms from L to A, obtaining results on its total control. We define the concept of an F-inverse Lie semialgebra and obtain Lie theoretic analogues of some classical results of the theory of inverse semigroups, namely, we show that the category of partial representations of L in meet semilattices is equivalent to the category F of F-inverse Lie semialgebras with morphisms that preserve the greatest elements of σ-classes. In addition, we establish an adjunction between the category of Lie algebras and the category F.