Ilya Schurov
Published 2009-10-10Version 1
We show that there exist generic slow-fast systems with only one (time-scaling) parameter on the two-torus, which have canard cycles for arbitrary small values of this parameter. This is in drastic contrast with the planar case, where canards usually occur in two-parametric families. Here we treat systems with a convex slow curve. In this case there is a set of parameter values accumulating to zero for which the system has exactly one attracting and one repelling canard cycle. The basin of the attracting cycle is almost the whole torus.
Comments: To appear in Journal of Dynamical and Control Systems, presumably Vol. 16 (2010), No. 2; The final publication is available at www.springerlink.com
Journal: Journal of Dynamical and Control Systems, Vol. 16, Number 2, April 2010, 267-300
Duck farming on the two-torus: multiple canard cycles in generic slow-fast systems
On The Uniqueness of SRB Measures for Endomorphisms
On Uniqueness of Participation Factors
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