One-dimensional lazy quantum walks and occupancy rate

doi:10.1088/1674-1056/24/5/050305

Abstract

In this paper, we discuss the properties of lazy quantum walks. Our analysis shows that the lazy quantum walks have O(tⁿ) order of the n-th moment of the corresponding probability distribution, which is the same as that for normal quantum walks. The lazy quantum walk with a discrete Fourier transform (DFT) coin operator has a similar probability distribution concentrated interval to that of the normal Hadamard quantum walk. Most importantly, we introduce the concepts of occupancy number and occupancy rate to measure the extent to which the walk has a (relatively) high probability at every position in its range. We conclude that the lazy quantum walks have a higher occupancy rate than other walks such as normal quantum walks, classical walks, and lazy classical walks.

Keywords: lazy quantum walk occupancy number occupancy rate

Received: 21 October 2014
Revised: 03 December 2014
Accepted manuscript online:

PACS:	03.67.Ac	(Quantum algorithms, protocols, and simulations)
	03.67.Lx	(Quantum computation architectures and implementations)
	02.30.Nw	(Fourier analysis)

Fund:

Project of Beijing, China (Grant No. YETP0475 and YETP0477), the BUPT Excellent Ph. D. Students Foundation (Grant Nos. CX201325 and CX201326), and the China Scholarship Council (Grant No. 201306470046).

Corresponding Authors: Li Dan
E-mail: lidansusu007@163.com

About author: 03.67.Ac; 03.67.Lx; 02.30.Nw

Cite this article:

Li Dan (李丹), Michael Mc Gettrick, Zhang Wei-Wei (张伟伟), Zhang Ke-Jia (张可佳) One-dimensional lazy quantum walks and occupancy rate 2015 Chin. Phys. B 24 050305

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