Indistinguishable quantum walks on graphs relative to a bipartite quantum walker

Abstract

A distinguishability operator is defined for the continuous-time quantum walk (CTQW) of a bipartite quantum walker on two simply connected graphs, WGi,Gj = UGi(t) UGj(t') - UGj(t') UGi(t), where UGi(t) is the unitary CTQW operator for a labeled graph Gi over a time interval t. The null space of WGi,Gj defines the vector space of initial bipartite states whose time development is either constant or only dependent on t + t' and is invariant to which quantum walker subsystem goes with each graph. The set of null spaces corresponding with a set of WGi,Gj have interesting relations as subspaces, intersections between subspaces, and subspaces of intersections. These relations are depicted as Euler diagrams for labeled graphs of three and four vertices.