Twisted Orlicz algebras and complete isomorphism to operator algebras

Abstract

Let G be a locally compact group, let :G× G C be a 2-cocycle, and let (,) be a complementary pair of strictly increasing continuous Young functions. It is shown in OS2 that (L(G),) becomes an Arens regular dual Banach algebra if alignEq:2-cocycle bdd sum-abstract |(s,t)|≤ u(s)+v(t) \ \ \ (s,t∈ G) align for some u,v∈ S(G). We prove if L(G)⊂eq L2(G) and u,v can be chosen to belong to L2(G), then (L(G),) with the maximal operator space structure is completely isomorphic to an operator algebra. We also present further classes of 2-cocycles for which one could obtain such algebras generalizing in part the results of OS1. We apply our methods to compactly generated group of polynomial growth and demonstrate that our results could be applied to variety of cases.