Decomposition of the algebra of analytic functionals on a connected complex Lie group and its completions into iterated analytic smash products

Abstract

We show that a decomposition of a complex Lie group G into a semidirect product generates that of the algebra of analytic functional, A(G), into an analytic smash product in the sense of Pirkovskii. Also we find sufficient conditions for a semidirect product to generate similar decompositions of certain Arens-Michael completions of A(G). The main result: if G is connected, then its linearization admits a decomposition into an iterated semidirect product (with the composition series consisting of abelian factors and a semisimple factor) that induces a decomposition of algebras in a class of completions of A(G) into iterated analytic smash products. Considering the extreme cases, the envelope of A(G) in the class of all Banach algebras (aka the Arens-Michael envelope) and the envelope in the class Banach PI-algebras (a new concept that is introduced in this article), we decompose, in particular, these envelopes into iterated analytic smash products.