Quantum graphs in infinite-dimensions: Hilbert--Schmidts and Hilbert modules

Abstract

We develop two approaches to Quantum (or Non-commutative) Graphs based on arbitrary von Neumann algebras M⊂eq B(H): one looking at operator bimodules of Hilbert--Schmidt (instead of bounded) operators, and the second looking at Quantum Adjacency Operators. Hilbert--Schmidt Quantum Graphs relate to Weaver's picture of Quantum Graphs in a complex way: by defining certain hull operations, we find a bijection between certain subsets of both objects. Given a nfs weight on M the operator-valued weight -1 can be defined, as considered by Wasilewski for direct sums of matrix algebras. We show how to build a natural self-dual Hilbert C*-module from this, which mediates a bijection between HS Quantum Relations and projections e∈ M Mop. When e is integrable for the slice-map idop there is a related normal CP map A M M: this is a Quantum Adjacency Operator, which has a Kraus operator representation built from the HS Quantum Relation. When e and its tensor swap map are both integrable, we find certain symmetries of A. We illustrate our theory by a careful consideration of certain examples, including detailed links with the finite-dimensional setting.

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