The Arens-Michael envelopes of Laurent Ore extensions

Abstract

For an Arens-Michael algebra A we consider a class of A--bimodules which are invertible with respect to the projective bimodule tensor product. We call such bimodules topologically invertible over A. Given a Fr\'echet-Arens-Michael algebra A and an topologically invertible Fr\'echet A--bimodule M, we construct an Arens-Michael algebra LA(M) which serves as a topological version of the Laurent tensor algebra LA(M). Also, for a fixed algebra B we provide a condition on an invertible B-bimodule N sufficient for the Arens-Michael envelope of LB(N) to be isomorphic to LB(N). In particular, we prove that the Arens-Michael envelope of an invertible Ore extension A[x, x-1; α] is isomorphic to LA(Aα) provided that the Arens-Michael envelope of A is metrizable.