Pretty good quantum fractional revival in paths and cycles

Chan, Ada; Drazen, Whitney; Eisenberg, Or; Kempton, Mark; Lippner, Gabor

doi:10.5802/alco.189

Chan, Ada ¹ ; Drazen, Whitney ² ; Eisenberg, Or ³ ; Kempton, Mark ⁴ ; Lippner, Gabor ²

¹ Department of Mathematics and Statistics York University Toronto ON Canada
² Department of Mathematics Northeastern University Boston MA USA
³ Department of Mathematics Harvard University Cambridge MA USA
⁴ Department of Mathematics Brigham Young University Provo UT USA

Algebraic Combinatorics, Tome 4 (2021) no. 6, pp. 989-1004.

Résumé

We initiate the study of pretty good quantum fractional revival in graphs, a generalization of pretty good quantum state transfer in graphs. We give a complete characterization of pretty good fractional revival in a graph in terms of the eigenvalues and eigenvectors of the adjacency matrix of a graph. This characterization follows from a lemma due to Kronecker on Diophantine approximation, and is similar to the spectral characterization of pretty good state transfer in graphs. Using this, we give complete characterizations of when pretty good fractional revival can occur in paths and in cycles.

Reçu le : 2020-05-07
Révisé le : 2021-06-28
Accepté le : 2021-07-04
Publié le : 2022-01-04

DOI : 10.5802/alco.189

Classification : 05E30, 05C50, 33C05, 15A16, 81P40
Mots clés : Fractional revival, state transfer, quantum, graph

Affiliations des auteurs :

Chan, Ada ¹ ; Drazen, Whitney ² ; Eisenberg, Or ³ ; Kempton, Mark ⁴ ; Lippner, Gabor ²

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Chan, Ada; Drazen, Whitney; Eisenberg, Or; Kempton, Mark; Lippner, Gabor. Pretty good quantum fractional revival in paths and cycles. Algebraic Combinatorics, Tome 4 (2021) no. 6, pp. 989-1004. doi : 10.5802/alco.189. http://www.numdam.org/articles/10.5802/alco.189/

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