Quantum walks with sequential aperiodic jumps
Abstract
We analyze a set of discrete-time quantum walks for which the displacements on a chain follow binary aperiodic jumps according to three paradigmatic sequences: Fibonacci, Thue-Morse and Rudin-Shapiro. We use a generalized Hadamard coin as well as a generalized Fourier coin . We verify the QW experiences a slowdown of the wavepacket spreading --- --- by the aperiodic jumps whose exponent, , depends on the type of aperiodicity. Additional aperiodicity-induced effects also emerge, namely: (i) while the superdiffusive regime () is predominant, displays an unusual sensibility with the type of coin operator where the more pronounced differences emerge for the Rudin-Shapiro and random protocol; (ii) even though the angle of the coin operator is homogeneous in space and time, there is a nonmonotonic dependence of with . Fingerprints of the aperiodicity in the hoppings are also found when additional distributional measures such as Shannon entropy, IPR, Jensen-Shannon dissimilarity, and kurtosis are computed. Finally, we argue the spin-lattice entanglement is enhanced by aperiodic jumps.
Keywords
Cite
@article{arxiv.1910.02254,
title = {Quantum walks with sequential aperiodic jumps},
author = {Marcelo A. Pires and Sílvio M. Duarte Queirós},
journal= {arXiv preprint arXiv:1910.02254},
year = {2020}
}
Comments
Updated version, close to the published one