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Bibliographic Details
Main Authors: Lorenzana, Giulia Garcia, Martin, David, Avni, Yael, Seara, Daniel S., Fruchart, Michel, Biroli, Giulio, Vitelli, Vincenzo
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2509.17972
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author Lorenzana, Giulia Garcia
Martin, David
Avni, Yael
Seara, Daniel S.
Fruchart, Michel
Biroli, Giulio
Vitelli, Vincenzo
author_facet Lorenzana, Giulia Garcia
Martin, David
Avni, Yael
Seara, Daniel S.
Fruchart, Michel
Biroli, Giulio
Vitelli, Vincenzo
contents Nonreciprocal interactions are widely observed in nonequilibrium systems, from biological or sociological dynamics to open quantum systems. Despite the ubiquity of nonreciprocity, its impact on phase transitions is not fully understood. In this work, we derive criteria to perturbatively assess whether nonreciprocity changes the universality class of pairs of asymmetrically coupled systems undergoing a phase transition. These simple criteria are stated in terms of the unperturbed critical exponents, in the spirit of the Harris criterion for disordered systems, and agree with numerical simulations. Beyond nonreciprocity, our approach provides guidelines for assessing how dynamical phase transitions are affected by perturbations.
format Preprint
id arxiv_https___arxiv_org_abs_2509_17972
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle When is nonreciprocity relevant?
Lorenzana, Giulia Garcia
Martin, David
Avni, Yael
Seara, Daniel S.
Fruchart, Michel
Biroli, Giulio
Vitelli, Vincenzo
Statistical Mechanics
Disordered Systems and Neural Networks
Nonreciprocal interactions are widely observed in nonequilibrium systems, from biological or sociological dynamics to open quantum systems. Despite the ubiquity of nonreciprocity, its impact on phase transitions is not fully understood. In this work, we derive criteria to perturbatively assess whether nonreciprocity changes the universality class of pairs of asymmetrically coupled systems undergoing a phase transition. These simple criteria are stated in terms of the unperturbed critical exponents, in the spirit of the Harris criterion for disordered systems, and agree with numerical simulations. Beyond nonreciprocity, our approach provides guidelines for assessing how dynamical phase transitions are affected by perturbations.
title When is nonreciprocity relevant?
topic Statistical Mechanics
Disordered Systems and Neural Networks
url https://arxiv.org/abs/2509.17972