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A study of chaos for processes under small perturbations II - rigorous proof of chaos

creativeworkseries.issn1232-9274
dc.contributor.authorOprocha, Piotr
dc.contributor.authorWilczyński, Paweł
dc.date.available2017-09-29T07:12:45Z
dc.date.issued2010
dc.description.abstractIn the present paper we prove distributional chaos for the Poincaré map in the perturbed equation $\dot{z}=\left(1 + e^{i\kappa t} |z|^2\right)\bar{z}^2 - N e^{-i\frac{\pi}{3}}.$ Heteroclinic and homoclinic connections between two periodic solutions bifurcating from the stationary solution $0$ present in the system when $N = 0$ are also discussed.en
dc.description.versionwersja wydawnicza
dc.identifier.doihttp://dx.doi.org/10.7494/OpMath.2010.30.1.5
dc.identifier.eissn2300-6919
dc.identifier.issn1232-9274
dc.identifier.nukatdd2010318151
dc.identifier.urihttps://repo.agh.edu.pl/handle/AGH/50238
dc.language.isoeng
dc.relation.ispartofOpuscula Mathematica
dc.rightsAttribution 4.0 International
dc.rights.accessotwarty dostęp
dc.rights.urihttps://creativecommons.org/licenses/by/4.0/legalcode
dc.subjectdistributional chaosen
dc.subjectisolating segmentsen
dc.subjectfixed point indexen
dc.subjectbifurcationen
dc.titleA study of chaos for processes under small perturbations II - rigorous proof of chaosen
dc.title.relatedOpuscula Mathematica
dc.typeartykuł
dspace.entity.typePublication
publicationissue.issueNumberNo. 1
publicationissue.paginationpp. 5-36
publicationvolume.volumeNumberVol. 30
relation.isAuthorOfPublication1e300fd4-5b14-4d20-9eef-b816b45bc2a4
relation.isAuthorOfPublication.latestForDiscovery1e300fd4-5b14-4d20-9eef-b816b45bc2a4
relation.isJournalIssueOfPublication1c8fb727-a5ae-4972-a324-98909765ccea
relation.isJournalIssueOfPublication.latestForDiscovery1c8fb727-a5ae-4972-a324-98909765ccea
relation.isJournalOfPublication304b3b9b-59b9-4830-9178-93a77e6afbc7

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