Categorical (Co)Limits of Quantum Graphs

Abstract

We begin with the characterization of quantum graphs as left ideals in M eh M (the extended Haagerup tensor product of M with itself) to avoid technicalities surrounding representation dependence of quantum graphs. These left ideals roughly correspond to a canonical complement of a quantum graph. Using these left ideals and some operator space theory, we find a new, representation-free characterization of a morphism of quantum graphs compatible with previous representation-dependent morphisms. A notion of categorical (co)limit of quantum graphs follows. We also briefly explore an alternative quantization of graphs as bimodules over C*-algebras (C*-graphs), mostly to emphasize the point that a morphism of C*-graphs is not a morphism of C*-correspondences.