Research output: Contribution to journal › Article › peer-review
Different Types of Stable Periodic Points of Diffeormorphism of a Plane with a Homoclinic Point. / Vasil’eva, E. V.
In: Vestnik St. Petersburg University: Mathematics, Vol. 54, No. 2, 04.2021, p. 180-186.Research output: Contribution to journal › Article › peer-review
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TY - JOUR
T1 - Different Types of Stable Periodic Points of Diffeormorphism of a Plane with a Homoclinic Point
AU - Vasil’eva, E. V.
N1 - Vasil’eva, E.V. Different Types of Stable Periodic Points of Diffeomorphism of a Plane with a Homoclinic Orbit. Vestnik St.Petersb. Univ.Math. 54, 180–186 (2021). https://proxy.library.spbu.ru:2060/10.1134/S106345412102014X
PY - 2021/4
Y1 - 2021/4
N2 - Abstract: A diffeomorphism of the plane into itself with a fixed hyperbolic point is considered; it is assumed that there is a non-transversal homoclinic point. Stable and unstable manifolds are tangent to each other at the homoclinic point; there are various ways of tangency of stable and unstable manifolds. Diffeomorphisms of the plane with a non-transversal homoclinic point were analyzed in the studies of Sh. Newhouse, L.P. Shil’nikov, and other authors under the assumption that this point is a tangency point of finite order. It follows from the studies of these authors that an infinite set of stable periodic points can lie in a neighborhood of a homoclinic point; the presence of such a set depends on the properties of the hyperbolic point. In this paper, we assume that a homoclinic point is not a point at which the tangency of a stable and an unstable manifold is a tangency of finite order. There is a countable number of types of periodic points lying in the neighborhood of the homoclinic point; points belonging to the same type are called n-pass, where n is a natural number. In this paper, it is shown that, if the tangency is not finite-order, the neighborhood of a non-transversal homoclinic point can contain an infinite set of stable single-pass, two-pass, or three-pass periodic points with characteristic exponents bounded away from zero.
AB - Abstract: A diffeomorphism of the plane into itself with a fixed hyperbolic point is considered; it is assumed that there is a non-transversal homoclinic point. Stable and unstable manifolds are tangent to each other at the homoclinic point; there are various ways of tangency of stable and unstable manifolds. Diffeomorphisms of the plane with a non-transversal homoclinic point were analyzed in the studies of Sh. Newhouse, L.P. Shil’nikov, and other authors under the assumption that this point is a tangency point of finite order. It follows from the studies of these authors that an infinite set of stable periodic points can lie in a neighborhood of a homoclinic point; the presence of such a set depends on the properties of the hyperbolic point. In this paper, we assume that a homoclinic point is not a point at which the tangency of a stable and an unstable manifold is a tangency of finite order. There is a countable number of types of periodic points lying in the neighborhood of the homoclinic point; points belonging to the same type are called n-pass, where n is a natural number. In this paper, it is shown that, if the tangency is not finite-order, the neighborhood of a non-transversal homoclinic point can contain an infinite set of stable single-pass, two-pass, or three-pass periodic points with characteristic exponents bounded away from zero.
KW - characteristic exponents
KW - diffeomorphism
KW - non-transversal homoclinic point
KW - stability
UR - http://www.scopus.com/inward/record.url?scp=85108173676&partnerID=8YFLogxK
UR - https://link.springer.com/article/10.1134%2FS106345412102014X
M3 - Article
AN - SCOPUS:85108173676
VL - 54
SP - 180
EP - 186
JO - Vestnik St. Petersburg University: Mathematics
JF - Vestnik St. Petersburg University: Mathematics
SN - 1063-4541
IS - 2
ER -
ID: 86573693