Pumping approximately integrable systems

Pumping approximately integrable systems

Integrable models have an infinite number of conserved quantities but most realizations suffer from integrability breaking perturbations. Here the authors show that weakly driving such a system by periodic perturbations leads to large nonlinear responses governed by the approximate conservation laws...

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Bibliographic Details
Main Authors: Florian Lange, Zala Lenarčič, Achim Rosch
Format: Article
Language:English
Published: Nature Publishing Group 2017-06-01
Series:Nature Communications
Online Access:https://doi.org/10.1038/ncomms15767
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spelling doaj-654bbb3bd8964884b707565ac545f0912021-05-11T07:32:04ZengNature Publishing GroupNature Communications2041-17232017-06-01811810.1038/ncomms15767Pumping approximately integrable systemsFlorian Lange0Zala Lenarčič1Achim Rosch2Institute for Theoretical Physics, University of CologneInstitute for Theoretical Physics, University of CologneInstitute for Theoretical Physics, University of CologneIntegrable models have an infinite number of conserved quantities but most realizations suffer from integrability breaking perturbations. Here the authors show that weakly driving such a system by periodic perturbations leads to large nonlinear responses governed by the approximate conservation laws.https://doi.org/10.1038/ncomms15767
collection DOAJ
language English
format Article
sources DOAJ
author Florian Lange
Zala Lenarčič
Achim Rosch
spellingShingle Florian Lange
Zala Lenarčič
Achim Rosch
Pumping approximately integrable systems
Nature Communications
author_facet Florian Lange
Zala Lenarčič
Achim Rosch
author_sort Florian Lange
title Pumping approximately integrable systems
title_short Pumping approximately integrable systems
title_full Pumping approximately integrable systems
title_fullStr Pumping approximately integrable systems
title_full_unstemmed Pumping approximately integrable systems
title_sort pumping approximately integrable systems
publisher Nature Publishing Group
series Nature Communications
issn 2041-1723
publishDate 2017-06-01
description Integrable models have an infinite number of conserved quantities but most realizations suffer from integrability breaking perturbations. Here the authors show that weakly driving such a system by periodic perturbations leads to large nonlinear responses governed by the approximate conservation laws.
url https://doi.org/10.1038/ncomms15767
work_keys_str_mv AT florianlange pumpingapproximatelyintegrablesystems
AT zalalenarcic pumpingapproximatelyintegrablesystems
AT achimrosch pumpingapproximatelyintegrablesystems
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