On the Takai duality for $L^{p}$ operator crossed products

TL;DR

This paper investigates Takai duality for $L^p$ operator crossed products, constructing a homomorphism analogous to Williams' map, and establishes conditions under which it is an isomorphism, especially highlighting the case when $p=2$.

Contribution

It extends Takai duality to $L^p$ operator algebras by constructing a natural homomorphism and analyzing its isomorphism properties, generalizing known results from $C^*$-algebras.

Findings

The homomorphism $\

The map $\

Is an isometric isomorphism when $p=2$ and $G$ is finite.

Abstract

The aim of this paper is to study a problem raised by N. C. Phillips concerning the existence of Takai duality for $L^p$ operator crossed products $F^{p}(G,A,\alpha)$, where $G$ is a locally compact Abelian group, $A$ is an $L^{p}$ operator algebra and $\alpha$ 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 $\Phi$ from $F^{p}(\hat{G},F^p(G,A,\alpha),\hat{\alpha})$ to $\mathcal{K}(l^{p}(G))\otimes_{p}A$ which is a natural $L^p$-analog of D. Williams' map. For countable discrete Abelian groups $G$ and separable unital $L^p$ operator algebras $A$ which have unique $L^p$ operator matrix norms, we show that $\Phi$ is an isomorphism if and only if either $G$ is finite or $p=2$; in particular, $\Phi$ is an isometric isomorphism in the case that $p=2$. Moreover, it is proved that $\Phi$ is equivariant for the double dual action $\hat{\hat{\alpha}}$ of $G$ on $F^p(\hat{G},F^p(G,A,\alpha),\hat{\alpha})$ and the action $\mathrm{Ad}\rho\otimes\alpha$ of $G$ on $\mathcal{K}(l^p(G))\otimes_p A$.