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In a simple FitzHugh-Nagumo neuronal model with one fast and two slow variables, a
sequence of period-doubling bifurcations for small-scale oscillations precedes the
transition into the spiking regime. For a wide range of values of the timescale separation
parameter, this scenario is recovered numerically. Its relation to the singularly
perturbed integrable system is discussed.
We study the continuous and discontinuous planar piecewise differential systems separated by a straight line and formed by an arbitrary linear system and a class of quadratic center. We show that when these piecewise differential systems are continuous, they can have at most one limit cycle. However, when the piecewise differential systems are discontinuous, we show that they can have at most two limit cycles, and that there exist such systems with two limit cycles. Therefore, in particular, we...
We show the existence of a one-parameter family of cubic Kolmogorov system with an isochronous center in the realistic quadrant.
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