Abstract:
The relaxation oscilations and canard-solutions are studied in
the system of singularly perturbed differential equations with one slow
and one fast variables. The analysis is based on using classical
mathematics, i.e., without elements of nonstandard analysis.
The sufficient condition is presented for the fact that the relaxational
oscillation is the limit position of the canard set as the repelling
part of the slow manifold tends to zero.
Keywords:singular perturbations, slow and fast variables, slow surface, relaxation oscilations, canard-solutions.
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