Zobrazeno 1 - 10
of 24
pro vyhledávání: '"Alexander I Khibnik"'
Autor:
Fazoil I. Ataullakhanov, Irina V. Biktasheva, A. L. Afendikov, Yu S Il'yashenko, Yu. G. Zarkhin, Alexander Ivanovich Aptekarev, Vadim N. Biktashev, M. A. Roitberg, V. Yu. Lunin, V. S. Ryaben'kii, Vladimir Tikhomirov, R. D. Dagkesamanskii, Alexander I Khibnik, Roman Borisyuk, V. D. Lakhno, V. S. Posvyanskii, L. B. Ryashko, Evgeni V. Nikolaev, Alexandre Urzhumtsev, N. D. Vvedenskaya, Yakov G. Sinai, Nikolay K. Balabaev, A Tokarev, N.L. Lunina
Publikováno v:
Russian Mathematical Surveys. 72:185-198
Autor:
Vladimir I. Arnold, I M Gel'fand, Yakov Grigor'evich Sinai, Roman Matveevich Boricyuk, Evgenii Viktorovich Nikolaev, Yulij Sergeevich Ilyashenko, Vladimir Yur'evich Lunin, M. A. Roitberg, Yu B Radvogin, Alexander I Khibnik
Publikováno v:
Uspekhi Matematicheskikh Nauk. 54:199-204
Systems with sub-processes evolving on many different time scales are ubiquitous in applications: chemical reactions, electro-optical and neuro-biological systems, to name just a few. This volume contains papers that expose the state of the art in ma
Publikováno v:
Khibnik, A I, Krauskopf, B & Rousseau, C 1998, ' Global study of a family of cubic Lienard equations. ', Nonlinearity, vol. 11, no. 6, pp. 1505-1519 . https://doi.org/10.1088/0951-7715/11/6/005
Nonlinearity, 11(6), 1505-1519. IOP Publishing Ltd.
Nonlinearity, 11(6), 1505-1519. IOP Publishing Ltd.
We derive the global bifurcation diagram of a three-parameter family of cubic Liénard systems. This family seems to have a universal character in that its bifurcation diagram (or parts of it) appears in many models from applications for which a comb
Publikováno v:
Proceedings of the Royal Society of London. Series B: Biological Sciences. 264:1049-1056
Models describing systems of coevolving populations often have asymptotically non-equilibrium dynamics (Red Queen dynamics (RQD)). We claim that if evolution is much slower than ecological changes, RQD arises due to either fast ecological processes,
Publikováno v:
Bulletin of Mathematical Biology. 57:809-840
In this paper we present an oscillatory neural network composed of two coupled neural oscillators of the Wilson-Cowan type. Each of the oscillators describes the dynamics of average activities of excitatory and inhibitory populations of neurons. The
Publikováno v:
International Journal of Bifurcation and Chaos. :363-384
We present the bifurcation analysis of Chua’s circuit equations with a smooth nonlinearity, described by a cubic polynomial. Our study focuses on phenomena that can be observed directly in the numerical simulation of the model, and on phenomena whi
Publikováno v:
Physica D: Nonlinear Phenomena. 62:360-371
We present a numerical technique for the analysis of local bifurcations which is based on the continuation of structurally unstable invariant sets in a suitable phase-parameter space. The invariant sets involved in our study are equilibrium points an
Autor:
Alexander I. Khibnik
Publikováno v:
Mathematical Biosciences. 98:145-147
Publikováno v:
Nonlinear Dynamics of Interacting Populations
Externí odkaz:
https://explore.openaire.eu/search/publication?articleId=doi_________::e657cab75b16f8108f0f55dda21a6d10
https://doi.org/10.1142/9789812798725_0004
https://doi.org/10.1142/9789812798725_0004