Hilbert $C^*$-module independence

TL;DR

This paper introduces a new notion of independence for Hilbert $C^*$-modules, generalizing $C^*$-algebra independence, with characterizations and examples that deepen the understanding of module and algebra independence.

Contribution

It defines Hilbert $C^*$-module independence, explores its properties, and provides new characterizations and examples, enriching the theory of $C^*$-algebra and module independence.

Findings

Hilbert $C^*$-module independence generalizes $C^*$-algebra independence.

Characterizations involve states and inner product relations.

Provides examples and counterexamples illustrating the concept.

Abstract

We introduce the notion of Hilbert $C^*$-module independence: Let $\mathscr{A}$ be a unital $C^*$-algebra and let $\mathscr{E}_i\subseteq \mathscr{E},\,\,i=1, 2$, be ternary subspaces of a Hilbert $\mathscr{A}$-module $\mathscr{E}$. Then $\mathscr{E}_1$ and $\mathscr{E}_2$ are said to be Hilbert $C^*$-module independent if there are positive constants $m$ and $M$ such that for every state $\varphi_i$ on $\langle \mathscr{E}_i,\mathscr{E}_i\rangle,\,\,i=1, 2$, there exists a state $\varphi$ on $\mathscr{A}$ such that \begin{align*} m\varphi_i(|x|)\leq \varphi(|x|) \leq M\varphi_i(|x|^2)^{\frac{1}{2}},\qquad \mbox{for all~}x\in \mathscr{E}_i, i=1, 2. \end{align*} We show that it is a natural generalization of the notion of $C^*$-independence of $C^*$-algebras. Moreover, we demonstrate that even in case of $C^*$-algebras this concept of independence is new and has a nice characterization in terms of extensions. This enriches the theory of independence of $C^*$-algebras. We show that if $\langle \mathscr{E}_1,\mathscr{E}_1\rangle $ has the quasi extension property and $z\in \mathscr{E}_1\cap \mathscr{E}_2$ with $\|z\|=1$, then $|z|=1$. Several characterizations of Hilbert $C^*$-module independence and a new characterization of $C^*$-independence are given. One of characterizations states that if $z_0\in \mathscr{E}_1\cap \mathscr{E}_2$ is such that $\langle z_0,z_0\rangle=1$, then $\mathscr{E}_1$ and $\mathscr{E}_2$ are Hilbert $C^*$-module independent if and only if $\|\langle x,z_0\rangle\langle y,z_0\rangle\|=\|\langle x,z_0\rangle\|\,\|\langle y,z_0\rangle\|$ for all $x\in \mathscr{E}_1$ and $y\in \mathscr{E}_2$. We also provide some technical examples and counterexamples to illustrate our results.