Perfect State Transfer on Weighted Graphs of the Johnson Scheme

Abstract

We characterize perfect state transfer on real-weighted graphs of the Johnson scheme J(n,k). Given J(n,k)=\A1, A2, ·s, Ak\ and A(X) = w0A0 + ·s + wm Am, we show, using classical number theory results, that X has perfect state transfer at time τ if and only if n=2k, m 22(k) , and there are integers c1, c2, ·s, cm such that (i) cj is odd if and only if j is a power of 2, and (ii) for r=1,2,·s,m, \[wr = πτ Σj=rm cj2jj k-rj-r.\] We then characterize perfect state transfer on unweighted graphs of J(n,k). In particular, we obtain a simple construction that generates all graphs of J(n,k) with perfect state transfer at time π/2.