NONLINEAR RESONANCES, QUASI-PERIODICITY AND CHAOS IN A PERIODICALLY PERTURBED OSCILLATORY CHEMICAL-SYSTEM WITH INFINITE NUMBER OF BIFURCATIONS

Nonlinear resonances, quasiperiodicity and chaotic behavior induced by small periodic perturbations in a model describing coupled enzymatic reactions are observed. The unperturbed system exhibits an infinite number of period adding bifurcations if a bifurcation parameter is changed in some range. The Poincare transformation and 1D return map approach are used to analyze the behavior of the perturbed system.