Contact Bifurcations in Two-Dimensional Endomorphisms Related with Homoclinic or Heteroclinic Orbits

M.R. Ferchichi¹, I.Djellit², J.C. Sprott³

^1,2Laboratoire Math´ematiques, Dynamique et Mod´elisation, University of Annaba - Faculty of Sciences, Department of
Mathematics - P.B.12- 23000 Annaba , Algeria
³University of Wisconsin, Department of Physics - Madison, WI 53706 USA

(Received 9 June 2010, accepted 30 August 2010)

ABSTRACT

In this paper we show the homoclinic bifurcations which are involved in some contact bifurcations of basins of attraction in noninvertible two-dimensional map. That is, we are interested in the link between contact bifurcations of a chaotic area and homoclinic bifurcations of a saddle point or of an expanding fixed point located on the boundary of the basin of attraction of the chaotic area. We shall analyze the particular

case of a map having up to three distinct preimages, and the basins’s bifurcations are investigated by use of the technique of critical curves.