Perfect State Transfer in a Spin Chain without Mirror Symmetry

Abstract

We introduce an analytical XX spin chain with asymmetrical transport properties. It has an even number N+1 of sites labeled by n=0,·s N. It does not exhibit perfect state transfer (PST) from end-to-end but rather from the first site to the next to last one. In fact, PST of one-excitation states takes place between the even sites: n N-n-1, n=0,2,·s, N-1; while states localized at a single odd site undergo fractional revival (FR) over odd sites only. Perfect return is witnessed at double the PST/FR time. The couplings and local magnetic fields are related to the recurrence coefficients of the dual -1 Hahn polynomials.