Abstract:
We examine smooth four-dimensional vector fields reversible under some smooth
involution L that has a smooth two-dimensional submanifold of fixed points. Our main interest
here is in the orbit structure of such a system near two types of heteroclinic connections
involving saddle-foci and heteroclinic orbits connecting them. In both cases we found families
of symmetric periodic orbits, multi-round heteroclinic connections and countable families of
homoclinic orbits of saddle-foci. All this suggests that the orbit structure near such connections
is very complicated. A non-variational version of the stationary Swift – Hohenberg equation is
considered, as an example,where such structure has been found numerically.
The authors acknowledge a financial support from the Russian Science Foundation (grant 22-11-
00027). Numerical simulations of the paper were supported partially by Agreement 0729-2020-0036
of the Ministry of Science and Higher Education of the Russian Federation (L.M.L and K.N.T).
The work of K.N.T. when examining the nonvariational Swift-Hohenberg equation was supported
by the Russian Science Foundation (project 23-71-30008).
\Bibitem{KulLerTri24}
\by Nikolay E. Kulagin, Lev M. Lerman, Konstantin N. Trifonov
\mathnet{http://mi.mathnet.ru/rcd1244}
\crossref{https://doi.org/10.1134/S1560354724010040}
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This publication is cited in the following 1 articles:
Nikita Barabash, Igor Belykh, Alexey Kazakov, Michael Malkin, Vladimir Nekorkin, Dmitry Turaev, “In Honor of Sergey Gonchenko and Vladimir Belykh”, Regul. Chaotic Dyn., 29:1 (2024), 1–5
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