具有条件谱的双翼图上双翼行走的周期性

IF 2.6 3区物理与天体物理 Q2 PHYSICS, MULTIDISCIPLINARY

Physica Scripta Pub Date : 2024-09-12 DOI:10.1088/1402-4896/ad71ff

Qiuting Chen

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引用次数: 0

摘要

在本文中，我们研究了一类离散量子漫步，即所谓的二方漫步。其中包括著名的格罗弗漫步。离散量子漫步由以底层图的弧或边为索引的单元矩阵 U 的幂给出。当格罗弗漫步定义在最多有五个特征值的规则二方图上时，久保田给出了格罗弗漫步周期性的特征。我们扩展了久保田的结果--如果一个双线形图 G 的特征值的平方是代数整数，且最多有两个阶，那么我们就用它的谱来描述 G 上双线形行走的周期性。我们应用双方位行走的周期性结果，得到格罗弗行走在规则图上的周期性特征。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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Periodicity of bipartite walk on biregular graphs with conditional spectra

In this paper we study a class of discrete quantum walks, known as bipartite walks. These include the well-known Grover’s walks. A discrete quantum walk is given by the powers of a unitary matrix U indexed by arcs or edges of the underlying graph. The walk is periodic if Uk = I for some positive integer k. Kubota has given a characterization of periodicity of Grover’s walk when the walk is defined on a regular bipartite graph with at most five eigenvalues. We extend Kubota’s results—if a biregular graph G has eigenvalues whose squares are algebraic integers with degree at most two, we characterize periodicity of the bipartite walk over G in terms of its spectrum. We apply periodicity results of bipartite walks to get a characterization of periodicity of Grover’s walk on regular graphs.

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来源期刊

Physica Scripta 物理-物理：综合

CiteScore

3.70

自引率

3.40%

发文量

782

审稿时长

4.5 months

期刊介绍： Physica Scripta is an international journal for original research in any branch of experimental and theoretical physics. Articles will be considered in any of the following topics, and interdisciplinary topics involving physics are also welcomed: -Atomic, molecular and optical physics- Plasma physics- Condensed matter physics- Mathematical physics- Astrophysics- High energy physics- Nuclear physics- Nonlinear physics. The journal aims to increase the visibility and accessibility of research to the wider physical sciences community. Articles on topics of broad interest are encouraged and submissions in more specialist fields should endeavour to include reference to the wider context of their research in the introduction.