Hilbert C*-module independence

Abstract

We introduce the notion of Hilbert C*-module independence: Let A be a unital C*-algebra and let Ei⊂eq E,\,\,i=1, 2, be ternary subspaces of a Hilbert A-module E. Then E1 and E2 are said to be Hilbert C*-module independent if there are positive constants m and M such that for every state i on Ei,Ei,\,\,i=1, 2, there exists a state on A such that align* mi(|x|)≤ (|x|) ≤ Mi(|x|2)12, for all~x∈ Ei, i=1, 2. 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 E1,E1 has the quasi extension property and z∈ E1 E2 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 z0∈ E1 E2 is such that z0,z0=1, then E1 and E2 are Hilbert C*-module independent if and only if \| x,z0 y,z0\|=\| x,z0\|\,\| y,z0\| for all x∈ E1 and y∈ E2. We also provide some technical examples and counterexamples to illustrate our results.