Perfect quantum state transfer on the Johnson scheme
Combinatorics
2018-04-17 v2
Abstract
For any graph with the adjacency matrix , the transition matrix of the continuous-time quantum walk at time is given by the matrix-valued function . We say that there is perfect state transfer in from the vertex to the vertex at time if . It is an important problem to determine whether perfect state transfers can happen on a given family of graphs. In this paper we characterize all the graphs in the Johnson scheme which have this property. Indeed, we show that the Kneser graph is the only class in the scheme which admits perfect state transfers. We also show that, under some conditions, some of the unions of the graphs in the Johnson scheme admit perfect state transfer.
Cite
@article{arxiv.1710.09096,
title = {Perfect quantum state transfer on the Johnson scheme},
author = {Bahman Ahmadi and M. H. Shirdareh Haghighi and Ahmad Mokhtar},
journal= {arXiv preprint arXiv:1710.09096},
year = {2018}
}