On the Takai duality for Lp operator crossed products
Abstract
The aim of this paper is to study a problem raised by N. C. Phillips concerning the existence of Takai duality for Lp operator crossed products Fp(G,A,α), where G is a locally compact Abelian group, A is an Lp operator algebra and α is an isometric action of G on A. Inspired by D. Williams' proof for the Takai duality theorem for crossed products of C*-algebras, we construct a homomorphism from Fp(G,Fp(G,A,α),α) to K(lp(G))pA which is a natural Lp-analog of D. Williams' map. For countable discrete Abelian groups G and separable unital Lp operator algebras A which have unique Lp operator matrix norms, we show that is an isomorphism if and only if either G is finite or p=2; in particular, is an isometric isomorphism in the case that p=2. Moreover, it is proved that is equivariant for the double dual action α of G on Fp(G,Fp(G,A,α),α) and the action Adα of G on K(lp(G))p A.
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