Takesaki duality for weak* closed Lp-operator crossed products

Abstract

The aim of this paper is to study Takesaki duality for weak* closed Lp-operator crossed product W*p(G,A,α), where G is a countable discrete Abelian group, A is a unital separable weak* closed Lp-operator algebra (p>1), and α is a weak* continuous p-completely isometric action of G on A. In this paper, we construct a weak* continuous homomorphism from W*p(G,W*p(G,A,α),α) to B(lp(G))A. We show that is an isomorphism if and only if either p=2 or G is finite, and is an isometric isomorphism if either p=2 or G is trivial. It is also proved that is equivariant for the double dual action α of G on W*p(G,W*p(G,A,α),α) and the action Adpα of G on B(lp(G)) A. Furthermore, we prove that W*p(G,W*p(G,A,α),α) is weak* continuous isometrically isomorphic to B(lp(G))A if and only if either p=2 or G is trivial, and W*p(G,W*p(G,A,α),α) is weak* continuous isomorphic to B(lp(G))A if and only if either p=2 or G is finite when A=Mnp. This shows that Takesaki duality theorem of von Neumann algebras can be generalized to weak* closed L2-operator algebras, and this theorem can not be generalized to weak* closed Lp-operator algebras when p∈ (1,∞)\2\.