Laplacian pretty good fractional revival

Ada Chan; Bobae Johnson; Mengzhen Liu; Malena Schmidt; Zhanghan Yin; and Hanmeng Zhan

arXiv:2010.10465·math.CO·September 20, 2022·Discret. Math.

Laplacian pretty good fractional revival

Ada Chan, Bobae Johnson, Mengzhen Liu, Malena Schmidt, Zhanghan Yin, and Hanmeng Zhan

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TL;DR

This paper develops a theory for pretty good fractional revival in quantum walks on graphs using Laplacian matrices, classifying specific graph structures that exhibit this phenomenon.

Contribution

It introduces a new theoretical framework for Laplacian-based quantum walks and classifies paths and double stars with this property.

Findings

01

Classified paths with Laplacian pretty good fractional revival

02

Classified double star graphs with this property

03

Established theoretical foundations for quantum walk revival phenomena

Abstract

We develop the theory of pretty good fractional revival in quantum walks on graphs using their Laplacian matrices as the Hamiltonian. We classify the paths and the double stars that have Laplacian pretty good fractional revival.

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