Blue sky catastrophe in systems with nonclassical relaxation oscillations (original) (raw)
Abstract
The feasibility of the well-known blue sky bifurcation in a class of three-dimensional singularly perturbed systems of ordinary differential equations with one fast and two slow variables is studied. A characteristic property of the considered systems is that so-called nonclassical relaxation oscillations occur in them. The same name is used for oscillations with slow components, which are asymptotically close to some time-discontinuous functions and a δ-like fast component. Cases when the blue sky catastrophe results in a stable relaxation cycle or a stable two-dimensional invariant torus are analyzed. The problem of the appearance of homoclinic structures is also considered.
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Authors and Affiliations
- Demidov Yaroslavl State University, ul. Sovetskaya 14, Yaroslavl, 150000, Russia
S. D. Glyzin & A. Yu. Kolesov - Chernogolovka Scientific Center, Russian Academy of Sciences, ul. Lesnaya 9, Chernogolovka, Moscow oblast, 142432, Russia
S. D. Glyzin - Moscow State University, Moscow, 119991, Russia
N. Kh. Rozov
Authors
- S. D. Glyzin
- A. Yu. Kolesov
- N. Kh. Rozov
Corresponding author
Correspondence toS. D. Glyzin.
Additional information
Original Russian Text © S.D. Glyzin, A.Yu. Kolesov, N.Kh. Rozov, 2015, published in Modelirovanie i Analiz Informatsionnykh Sistem, 2015, No. 1, pp. 38–64.
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Glyzin, S.D., Kolesov, A.Y. & Rozov, N.K. Blue sky catastrophe in systems with nonclassical relaxation oscillations.Aut. Control Comp. Sci. 49, 525–546 (2015). https://doi.org/10.3103/S0146411615070081
- Received: 20 December 2014
- Published: 28 January 2016
- Issue date: December 2015
- DOI: https://doi.org/10.3103/S0146411615070081