Bifurcations of systems with structurally unstable homoclinic orbits and moduli of ω-equivalence

S. V. Gonchenko; L. P. Shil'nikov; O. V. Sten'kin; D. V. Turaev

doi:10.1016/s0898-1221(97)00121-1

Bifurcations of systems with structurally unstable homoclinic orbits and moduli of ω-equivalence

S. V. Gonchenko, L. P. Shil'nikov, O. V. Sten'kin, D. V. Turaev

Research output: Contribution to journal › Article › peer-review

4 Scopus citations

Abstract

Bifurcations of both two-dimensional diffeomorphisms with a homoclinic tangency and three-dimensional flows with a homoclinic loop of an equilibrium state of saddle-focus type are studied in one-and two-parameter families. Due to the well-known impossibility of a complete study of such bifurcations, the problem is restricted to the study of the bifurcations of the so-called low-round periodic orbits. In this connection, the idea of taking Ω-moduli (continuous invariants of the topological conjugacy on the nonwandering set) as the main control parameters (together with the standard splitting parameter) is proposed. On this way, new bifurcational effects are found which do not occur at a one-parameter analysis. In particular, the density of cusp-bifurcations is revealed.

Original language	English
Pages (from-to)	111-142
Number of pages	32
Journal	Computers and Mathematics with Applications
Volume	34
Issue number	2-4
DOIs	https://doi.org/10.1016/s0898-1221(97)00121-1
State	Published - 1 Jan 1997
Externally published	Yes

Keywords

Bifurcation
Homoclinic tangency
Modulus

ASJC Scopus subject areas

Modeling and Simulation
Computational Theory and Mathematics
Computational Mathematics

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10.1016/s0898-1221(97)00121-1

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title = "Bifurcations of systems with structurally unstable homoclinic orbits and moduli of ω-equivalence",

abstract = "Bifurcations of both two-dimensional diffeomorphisms with a homoclinic tangency and three-dimensional flows with a homoclinic loop of an equilibrium state of saddle-focus type are studied in one-and two-parameter families. Due to the well-known impossibility of a complete study of such bifurcations, the problem is restricted to the study of the bifurcations of the so-called low-round periodic orbits. In this connection, the idea of taking Ω-moduli (continuous invariants of the topological conjugacy on the nonwandering set) as the main control parameters (together with the standard splitting parameter) is proposed. On this way, new bifurcational effects are found which do not occur at a one-parameter analysis. In particular, the density of cusp-bifurcations is revealed.",

keywords = "Bifurcation, Homoclinic tangency, Modulus",

author = "Gonchenko, {S. V.} and Shil'nikov, {L. P.} and Sten'kin, {O. V.} and Turaev, {D. V.}",

note = "Funding Information: wss supported by EC-Russia Collaborative Project ESPRIT-P9282-ACTCS, by the INTAS ext. and by the Russian Foundation of Fundamental Researches, Grant No. 96-01-01135. it wss established in [3,4] that the values of p for which X, has a structurally unstable a dense set.",

year = "1997",

month = jan,

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doi = "10.1016/s0898-1221(97)00121-1",

language = "English",

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pages = "111--142",

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T1 - Bifurcations of systems with structurally unstable homoclinic orbits and moduli of ω-equivalence

AU - Gonchenko, S. V.

AU - Shil'nikov, L. P.

AU - Sten'kin, O. V.

AU - Turaev, D. V.

N1 - Funding Information: wss supported by EC-Russia Collaborative Project ESPRIT-P9282-ACTCS, by the INTAS ext. and by the Russian Foundation of Fundamental Researches, Grant No. 96-01-01135. it wss established in [3,4] that the values of p for which X, has a structurally unstable a dense set.

PY - 1997/1/1

Y1 - 1997/1/1

N2 - Bifurcations of both two-dimensional diffeomorphisms with a homoclinic tangency and three-dimensional flows with a homoclinic loop of an equilibrium state of saddle-focus type are studied in one-and two-parameter families. Due to the well-known impossibility of a complete study of such bifurcations, the problem is restricted to the study of the bifurcations of the so-called low-round periodic orbits. In this connection, the idea of taking Ω-moduli (continuous invariants of the topological conjugacy on the nonwandering set) as the main control parameters (together with the standard splitting parameter) is proposed. On this way, new bifurcational effects are found which do not occur at a one-parameter analysis. In particular, the density of cusp-bifurcations is revealed.

AB - Bifurcations of both two-dimensional diffeomorphisms with a homoclinic tangency and three-dimensional flows with a homoclinic loop of an equilibrium state of saddle-focus type are studied in one-and two-parameter families. Due to the well-known impossibility of a complete study of such bifurcations, the problem is restricted to the study of the bifurcations of the so-called low-round periodic orbits. In this connection, the idea of taking Ω-moduli (continuous invariants of the topological conjugacy on the nonwandering set) as the main control parameters (together with the standard splitting parameter) is proposed. On this way, new bifurcational effects are found which do not occur at a one-parameter analysis. In particular, the density of cusp-bifurcations is revealed.

KW - Bifurcation

KW - Homoclinic tangency

KW - Modulus

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U2 - 10.1016/s0898-1221(97)00121-1

DO - 10.1016/s0898-1221(97)00121-1

M3 - Article

AN - SCOPUS:0031186017

SN - 0898-1221

VL - 34

SP - 111

EP - 142

JO - Computers and Mathematics with Applications

JF - Computers and Mathematics with Applications

IS - 2-4

ER -

Bifurcations of systems with structurally unstable homoclinic orbits and moduli of ω-equivalence

Abstract

Keywords

ASJC Scopus subject areas

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