Quantitative analysis of phase transitions in two-dimensional XY models using persistent homology

Sale, Nicholas; Giansiracusa, Jeffrey; Lucini, Biagio

doi:10.1103/physreve.105.024121

Quantitative analysis of phase transitions in two-dimensional XY models using persistent homology

Sale, Nicholas; Giansiracusa, Jeffrey; Lucini, Biagio

Authors

Nicholas Sale

Professor Jeffrey Giansiracusa jeffrey.giansiracusa@durham.ac.uk
Professor

Biagio Lucini

Abstract

We use persistent homology and persistence images as an observable of three different variants of the two-dimensional XY model in order to identify and study their phase transitions. We examine models with the classical XY action, a topological lattice action, and an action with an additional nematic term. In particular, we introduce a new way of computing the persistent homology of lattice spin model configurations and, by considering the fluctuations in the output of logistic regression and k-nearest neighbours models trained on persistence images, we develop a methodology to extract estimates of the critical temperature and the critical exponent of the correlation length. We put particular emphasis on finite-size scaling behaviour and producing estimates with quantifiable error. For each model we successfully identify its phase transition(s) and are able to get an accurate determination of the critical temperatures and critical exponents of the correlation length.

Citation

Sale, N., Giansiracusa, J., & Lucini, B. (2022). Quantitative analysis of phase transitions in two-dimensional XY models using persistent homology. Physical Review E, 105(2), https://doi.org/10.1103/physreve.105.024121

Journal Article Type	Article
Acceptance Date	Feb 1, 2022
Online Publication Date	Feb 14, 2022
Publication Date	2022-02
Deposit Date	Feb 2, 2022
Publicly Available Date	Feb 2, 2022
Journal	Physical Review E
Print ISSN	2470-0045
Electronic ISSN	2470-0053
Publisher	American Physical Society
Peer Reviewed	Peer Reviewed
Volume	105
Issue	2
DOI	https://doi.org/10.1103/physreve.105.024121
Public URL	https://durham-repository.worktribe.com/output/1216282

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Copyright Statement
Reprinted with permission from the American Physical Society: Sale, Nicholas, Giansiracusa, Jeffrey & Lucini, Biagio (2022). Quantitative analysis of phase transitions in two-dimensional XY models using persistent homology. Physical Review E 105(2): 024121. © (2022) by the American Physical Society. Readers may view, browse, and/or download material for temporary copying purposes only, provided these uses are for noncommercial personal purposes. Except as provided by law, this material may not be further reproduced, distributed, transmitted, modified, adapted, performed, displayed, published, or sold in whole or part, without prior written permission from the American Physical Society.