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<article article-type="research-article" dtd-version="1.3" xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink" xmlns:xsi="http://www.w3.org/2001/XMLSchema-instance" xml:lang="ru"><front><journal-meta><journal-id journal-id-type="publisher-id">cheb</journal-id><journal-title-group><journal-title xml:lang="ru">Чебышевский сборник</journal-title><trans-title-group xml:lang="en"><trans-title>Chebyshevskii Sbornik</trans-title></trans-title-group></journal-title-group><issn pub-type="ppub">2226-8383</issn><publisher><publisher-name>Tula State Lev Tolstoy  Pedagogical University</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.22405/2226-8383-2017-18-4-127-138</article-id><article-id custom-type="elpub" pub-id-type="custom">cheb-383</article-id><article-categories><subj-group subj-group-type="heading"><subject>Research Article</subject></subj-group><subj-group subj-group-type="section-heading" xml:lang="ru"><subject>Статьи</subject></subj-group><subj-group subj-group-type="section-heading" xml:lang="en"><subject>Article</subject></subj-group></article-categories><title-group><article-title>ОБ ОДНОМ ПОДХОДЕ К ПОСТРОЕНИЮ ХАОТИЧЕСКИХ СИСТЕМ-ХАМЕЛЕОНОВ</article-title><trans-title-group xml:lang="en"><trans-title>ABOUT ONE APPROACH TO CONSTRUCTION OF CHAOTIC CHAMELEONS SYSTEMS</trans-title></trans-title-group></title-group><contrib-group><contrib contrib-type="author" corresp="yes"><name-alternatives><name name-style="eastern" xml:lang="ru"><surname>Буркин</surname><given-names>И. М.</given-names></name><name name-style="western" xml:lang="en"><surname>Burkin</surname><given-names>I. M.</given-names></name></name-alternatives><bio xml:lang="ru"><p>Тула.</p></bio><bio xml:lang="en"><p>Tula.</p></bio></contrib></contrib-group><pub-date pub-type="collection"><year>2017</year></pub-date><pub-date pub-type="epub"><day>08</day><month>03</month><year>2018</year></pub-date><volume>18</volume><issue>4</issue><fpage>127</fpage><lpage>138</lpage><permissions><copyright-statement>Copyright &amp;#x00A9; Буркин И.М., 2018</copyright-statement><copyright-year>2018</copyright-year><copyright-holder xml:lang="ru">Буркин И.М.</copyright-holder><copyright-holder xml:lang="en">Burkin I.M.</copyright-holder><license xml:lang="ru" license-type="creative-commons-attribution" xlink:href="https://creativecommons.org/licenses/by/4.0/" xlink:type="simple"><license-p>Данная работа распространяется под лицензией Creative Commons Attribution 4.0.</license-p></license><license xml:lang="en" license-type="creative-commons-attribution" xlink:href="https://creativecommons.org/licenses/by/4.0/" xlink:type="simple"><license-p>This work is licensed under a Creative Commons Attribution 4.0 License.</license-p></license></permissions><self-uri xlink:href="https://www.chebsbornik.ru/jour/article/view/383">https://www.chebsbornik.ru/jour/article/view/383</self-uri><abstract><p>Сегодня хорошо известно, что динамические системы можно подразделить на системы с самовозбуждающимися и системы со скрытыми аттракторами. Cамовозбуждающийся аттрактор имеет область притяжения, которая примыкает к неустойчивым состояниям равновесия системы, в то время как скрытые аттракторы имеют области притяжения, не пересекающиеся с малыми окрестностями ни одного из состояний равновесия. Скрытые аттракторы играют важную роль в инженерных приложениях, поскольку их наличие вызывает неожиданные и потенциально опасные ответы на возмущения, например, в таких структурах как мост, или крыло самолета. Кроме того, сложное поведения хаотических систем используют в различных областях, от таких, как изображения водяных знаков, аудио схема шифрования, хаотическая маскировка коммуникаций, до генераторов случайных чисел. Недавно исследователями были обнаружены так называемые "системы-хамелеоны". Эти системы были так названы потому, что они демонстрируют самовозбуждающиеся или скрытые колебания в зависимости от значений входящих в них параметров. В настоящей работе предлагается простой алгоритм синтезирования однопараметрических системхамелеонов. Отслеживается эволюция ляпуновских показателей и размерности КапланаЙорке таких систем при изменении параметра.</p></abstract><trans-abstract xml:lang="en"><p>Now it is well known that dynamical systems can be categorized into systems with selfexcited attractors and systems with hidden attractors. A self-excited attractor has a basin of attraction that is associated with an unstable equilibrium, while a hidden attractor has a basin of attraction that does not intersect with small neighborhoods of any equilibrium points. Hidden attractors play the important role in engineering applications because they allow unexpected and potentially disastrous responses to perturbations in a structure like a bridge or an airplane wing. In addition, complex behaviors of chaotic systems have been applied in various areas from image watermarking, audio encryption scheme, asymmetric color pathological image encryption, chaotic masking communication to random number generator. Recently so-called chameleons systems have been found out by researchers. These systems were so are named for the reason, that they shows self-excited or hidden oscillations depending on the value of parameters entering into them. In the present work the simple algorithm of synthesizing of oneparametrical chameleons systems is offered. Evolution Lyapunov exponents and Kaplan-Yorke dimension of such systems at change of parameter is traced.</p></trans-abstract><kwd-group xml:lang="ru"><kwd>самовозбуждающийсяаттрактор</kwd><kwd>скрытыйаттрактор</kwd><kwd>мультистабильность</kwd><kwd>цикл</kwd><kwd>бифуркация</kwd><kwd>система-хамелеон</kwd><kwd>показатели Ляпунова</kwd><kwd>размерность Каплана-Йорке</kwd></kwd-group><kwd-group xml:lang="en"><kwd>self-excited attractor</kwd><kwd>hidden attractor</kwd><kwd>multistability</kwd><kwd>cycle</kwd><kwd>bifurcation</kwd><kwd>chameleon system</kwd><kwd>Lyapunov exponents</kwd><kwd>Kaplan–Yorke dimension</kwd></kwd-group></article-meta></front><back><ref-list><title>References</title><ref id="cit1"><label>1</label><citation-alternatives><mixed-citation xml:lang="ru">Lorenz, E. N. 1963, "Deterministic nonperiodic flow". J.Atmos.Sci., vol.20, pp.65 -75.</mixed-citation><mixed-citation xml:lang="en">Lorenz, E. N. 1963, "Deterministic nonperiodic flow". 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