Pretty Good State Transfer on Circulant Graphs
Abstract
Let be a graph with adjacency matrix . The transition matrix of relative to is defined by . The graph is said to admit pretty good state transfer between a pair of vertices and if there exists a sequence of real numbers and a complex number of unit modulus such that We find that pretty good state transfer occurs in a cycle on vertices if and only if is a power of two and it occurs between every pair of antipodal vertices. In addition, we look for pretty good state transfer in more general circulant graphs. We prove that union (edge disjoint) of an integral circulant graph with a cycle, each on vertices, admits pretty good state transfer. The complement of such union also admits pretty good state transfer. This enables us to find some non-circulant graphs admitting pretty good state transfer. Among the complement of cycles we also find a class of graphs not exhibiting pretty good state transfer.
Keywords
Cite
@article{arxiv.1607.03598,
title = {Pretty Good State Transfer on Circulant Graphs},
author = {Hiranmoy Pal and Bikash Bhattacharjya},
journal= {arXiv preprint arXiv:1607.03598},
year = {2019}
}