On the Takai duality of Lp operator crossed products, II

Abstract

This paper aims to study the Lp Takai duality problem raised by N. C. Phillips. Let G be a countable discrete Abelian group, A be a separable unital Lp operator algebra with p∈ [1,∞), and α be an isometric action of G on A. When A is p-incompressible and has unique Lp operator matrix norms, it is proved in this paper that the iterated Lp operator crossed product Fp(G,Fp(G,A,α),α) is isometrically isomorphic to MGppA if and only if p=2.

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