Multiple island chains in wave-particle interactions

M. C. De Sousa; I. L. Caldas; A. M.Ozorio De Almeida; F. B. Rizzato; R. Pakter

doi:10.1088/1742-6596/641/1/012003

Multiple island chains in wave-particle interactions

M. C. De Sousa
, I. L. Caldas
, A. M.Ozorio De Almeida
, F. B. Rizzato
, R. Pakter

University of São Paulo
Centro Brasileiro de Pesquisas Fisicas
Universidade Federal do Rio Grande do Sul

Résultats de recherche: Contribution à un journal › Article de conférence › Revue par des pairs

Résumé

We analyze the isochronous island chains that appear in the Poincaré sections of near integrable twist systems. When the system presents just one resonant perturbation with a winding number, the number of chains is constant and it is completely determined by the perturbation. However, for systems that are perturbed by an infinite number of resonant perturbations with the same winding number, the number of isochronous chains depends on the superposition of the perturbations and it is a function of the parameters. Considering a system that describes wave-particle interaction, we show that the number of island chains increases without limit when the wave period or wave number are increased.

langue originale	Anglais
Numéro d'article	012003
journal	Journal of Physics: Conference Series
Volume	641
Numéro de publication	1
Les DOIs	https://doi.org/10.1088/1742-6596/641/1/012003
état	Publié - 7 oct. 2015
Modification externe	Oui
Evénement	17th Brazilian Colloquium on Orbital Dynamics, CBDO 2014 - Aguas de Lindoia, Brésil Durée: 1 déc. 2014 → 5 déc. 2014

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10.1088/1742-6596/641/1/012003

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title = "Multiple island chains in wave-particle interactions",

abstract = "We analyze the isochronous island chains that appear in the Poincar{\'e} sections of near integrable twist systems. When the system presents just one resonant perturbation with a winding number, the number of chains is constant and it is completely determined by the perturbation. However, for systems that are perturbed by an infinite number of resonant perturbations with the same winding number, the number of isochronous chains depends on the superposition of the perturbations and it is a function of the parameters. Considering a system that describes wave-particle interaction, we show that the number of island chains increases without limit when the wave period or wave number are increased.",

author = "\{De Sousa\}, \{M. C.\} and Caldas, \{I. L.\} and \{De Almeida\}, \{A. M.Ozorio\} and Rizzato, \{F. B.\} and R. Pakter",

note = "Publisher Copyright: {\textcopyright} Published under licence by IOP Publishing Ltd.; 17th Brazilian Colloquium on Orbital Dynamics, CBDO 2014 ; Conference date: 01-12-2014 Through 05-12-2014",

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TY - JOUR

T1 - Multiple island chains in wave-particle interactions

AU - De Sousa, M. C.

AU - Caldas, I. L.

AU - De Almeida, A. M.Ozorio

AU - Rizzato, F. B.

AU - Pakter, R.

N1 - Publisher Copyright: © Published under licence by IOP Publishing Ltd.

PY - 2015/10/7

Y1 - 2015/10/7

N2 - We analyze the isochronous island chains that appear in the Poincaré sections of near integrable twist systems. When the system presents just one resonant perturbation with a winding number, the number of chains is constant and it is completely determined by the perturbation. However, for systems that are perturbed by an infinite number of resonant perturbations with the same winding number, the number of isochronous chains depends on the superposition of the perturbations and it is a function of the parameters. Considering a system that describes wave-particle interaction, we show that the number of island chains increases without limit when the wave period or wave number are increased.

AB - We analyze the isochronous island chains that appear in the Poincaré sections of near integrable twist systems. When the system presents just one resonant perturbation with a winding number, the number of chains is constant and it is completely determined by the perturbation. However, for systems that are perturbed by an infinite number of resonant perturbations with the same winding number, the number of isochronous chains depends on the superposition of the perturbations and it is a function of the parameters. Considering a system that describes wave-particle interaction, we show that the number of island chains increases without limit when the wave period or wave number are increased.

UR - https://www.scopus.com/pages/publications/84958647525

U2 - 10.1088/1742-6596/641/1/012003

DO - 10.1088/1742-6596/641/1/012003

M3 - Conference article

AN - SCOPUS:84958647525

SN - 1742-6588

VL - 641

JO - Journal of Physics: Conference Series

JF - Journal of Physics: Conference Series

IS - 1

M1 - 012003

T2 - 17th Brazilian Colloquium on Orbital Dynamics, CBDO 2014

Y2 - 1 December 2014 through 5 December 2014

ER -

Multiple island chains in wave-particle interactions

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