Hostname: page-component-8448b6f56d-c47g7 Total loading time: 0 Render date: 2024-04-23T22:51:41.359Z Has data issue: false hasContentIssue false
  • English
  • Français

The cusp horseshoe and its bifurcations in the unfolding of an inclination-flip homoclinic orbit

Published online by Cambridge University Press:  19 September 2008

Ale Jan Homburg ,
Hiroshi Kokubu  and
Martin Krupa
Ale Jan Homburg
Affiliation:
Department of Mathematics, Rijksuniversiteit Groningen, PB 800, 9700 AV Groningen, The Netherlands
Hiroshi Kokubu
Affiliation:
Department of Mathematics, Faculty of Science, Kyoto University, Kyoto 606, Japan
Martin Krupa
Affiliation:
Department of Mathematics, Rijksuniversiteit Groningen, PB 800, 9700 AV Groningen, The Netherlands
Get access Rights & Permissions [Opens in a new window]

Abstract

Deng has demonstrated a mechanism through which a perturbation of a vector field having an inclination-flip homoclinic orbit would have a Smale horseshoe. In this article we prove that if the eigenvalues of the saddle to which the homoclinic orbit is asymptotic satisfy the condition 2λu > min{−λs, λuu} then there are arbitrarily small perturbations of the vector field which possess a Smale horseshoe. Moreover we analyze a sequence of bifurcations leading to the annihilation of the horseshoe. This sequence contains, in particular, the points of existence of n-homoclinic orbits with arbitrary n.

Type
Research Article
Information
Ergodic Theory and Dynamical Systems , Volume 14 , Issue 4 , December 1994 , pp. 667 - 693
Copyright
Copyright © Cambridge University Press 1994

Access options

Get access to the full version of this content by using one of the access options below. (Log in options will check for institutional or personal access. Content may require purchase if you do not have access.)

References

REFERENCES

[AGK91]Aronson, D.G., Golubitsky, M. and Krupa, M.. Coupled arrays of Josephson junctions and bifurcations of maps with S N symmetry. Nonlinearity 4 (1991), 861902.CrossRefGoogle Scholar
[AvGK94]Aronson, D.G., Gils, S.A. van and Krupa, M.. Homoclinic twist bifurcations with ℤ2 symmetry. J. Nonlin. Sci. 4 (1994), 195219.CrossRefGoogle Scholar
[CDF90]Chow, S.-N., Deng, B. and Fiedler, B.. Homoclinic bifurcation at resonant eigenvalues. J. Dyn. Diff. Eq. 2 (1990), 177244.CrossRefGoogle Scholar
[Deng93]Deng, B.. Homoclinic twisting bifurcations and cusp horseshoe maps. J. Dyn. Diff. Eq. 5 (1993), 417467.CrossRefGoogle Scholar
[DKO92]Dumortier, F., Kokubu, H. and Oka, H.. A degenerate singularity generating geometric Lorenz attractors. Preprint. 1992.Google Scholar
[Hen81]Henry, D.. Geometric Theory of Semilinear Parabolic Equations. Springer Lecture Notes in Mathematics 840. Springer: Berlin, 1981.Google Scholar
[Hom93]Homburg, A.J.. Some global aspects of homoclinic bifurcations of vector fields. PhD thesis. University of Groningen.Google Scholar
[HPS77]Hirsch, M., Pugh, C. and Shub, M.. Invariant Manifolds. Springer Lecture Notes in Mathematics 583. Springer: Berlin, 1977.Google Scholar
[KKO93a]Kisaka, M., Kokubu, H. and Oka, H.. Bifurcations to N-homoclinic orbits and N-periodic orbits in vector fields. J. Dyn. Diff. Eq. 5 (1993), 305357.Google Scholar
[KKO93b]Kisaka, M., Kokubu, H. and Oka, H.. Supplement to homoclinic doubling bifurcation in vector fields. Dynamical Systems, eds. Bamon, R., Labarca, R., Lewowicz, J. and Palis, J., pp. 92116. Longman: 1993.Google Scholar
[Moser73]Moser, J.. Stable and Random Motions in Dynamical Systems. Princeton University Press: Princeton, 1973.Google Scholar
[PT93]Palis, J. and Takens, F.. Hyperbolicity and Sensitive Chaotic Dynamics at Homoclinic Bifurcations. Cambridge University Press: Cambridge, 1993.Google Scholar
[Rob89]Robinson, C.. Homoclinic bifurcation to a transitive attractor of Lorenz type. Nonlinearity 2 (1989), 495518.CrossRefGoogle Scholar
[Rych90]Rychlik, M.R.. Lorenz-attractors through Shilnikov-type bifurcation, Part I. Ergod. Th. & Dynam. Sys. 10 (1990), 793821.CrossRefGoogle Scholar
[San93]Sandstede, B.. Verzeigungstheorie homokliner Verdopplungen. PhD thesis. Free University of Berlin; Institut für Angewandte Analysis und Stochastik. Report No. 7, Berlin, 1993.Google Scholar
[Shil68]Shil'nikov, L.P.. On the generation of a periodic motion from trajectories doubly asymptotic to an equilibrium of state of saddle type. Math. USSR Sbornik 6 (1968), 427437.CrossRefGoogle Scholar
[Yan87]Yanagida, E.. Branching of double pulse solutions from single pulse solutions in nerve axon equations. J. Diff. Eq. 66 (1987), 243262.Google Scholar