Quantum state transfer on Q-graphs

Abstract

We study the existence of quantum state transfer in Q-graphs in this paper. The Q-graph of a graph G, denoted by Q(G), is the graph derived from G by plugging a new vertex to each edge of G and joining two new vertices which lie on adjacent edges of G by an edge. We show that, if all eigenvalues of a regular graph G are integers, then its Q-graph Q(G) has no perfect state transfer. In contrast, we also prove that the Q-graph of a regular graph has pretty good state transfer under some mild conditions. Finally, applying the obtained results, we also exhibit many new families of Q-graphs having no perfect state transfer, but admitting pretty good state transfer.