Crossovers induced by discrete-time quantum walks

TL;DR

This paper explores how discrete-time quantum walks can transition to continuous-time quantum and random walks through parameter limits, revealing a spectrum of spreading behaviors from diffusive to ballistic in quantum systems.

Contribution

It introduces a new class of final-time-dependent quantum walks and analyzes their convergence properties, connecting discrete and continuous quantum and random walks.

Findings

Crossovers from diffusive to ballistic spreading are characterized by a parameter shift.

A new class of final-time-dependent quantum walks is proposed and analyzed.

Weak convergence theorems describe diverse spreading behaviors in quantum walks.

Abstract

We consider crossovers with respect to the weak convergence theorems from a discrete-time quantum walk (DTQW). We show that a continuous-time quantum walk (CTQW) and discrete- and continuous-time random walks can be expressed as DTQWs in some limit. At first we generalize our previous study [Phys. Rev. A \textbf{81}, 062129 (2010)] on the DTQW with position measurements. We show that the position measurements per each step with probability $p \sim 1/n^\beta$ can be evaluated, where $n$ is the final time and $0<\beta<1$. We also give a corresponding continuous-time case. As a consequence, crossovers from the diffusive spreading (random walk) to the ballistic spreading (quantum walk) can be seen as the parameter $\beta$ shifts from 0 to 1 in both discrete- and continuous-time cases of the weak convergence theorems. Secondly, we introduce a new class of the DTQW, in which the absolute value of the diagonal parts of the quantum coin is proportional to a power of the inverse of the final time $n$. This is called a final-time-dependent DTQW (FTD-DTQW). The CTQW is obtained in a limit of the FTD-DTQW. We also obtain the weak convergence theorem for the FTD-DTQW which shows a variety of spreading properties. Finally, we consider the FTD-DTQW with periodic position measurements. This weak convergence theorem gives a phase diagram which maps sufficiently long-time behaviors of the discrete- and continuous-time quantum and random walks.