Pulse Bifurcations and Instabilities in an Excitable Medium: Computations in Finite Ring Domains

We investigate the instabilities and bifurcations of traveling pulses in a model excitable medium; in particular we discuss three different scenarios for the loss of stability resp. the disappearance of stable pulses. In numerical simulations beyond the instabilities we observe replication of pulses (backfiring) resulting in complex periodic or spatiotemporally chaotic dynamics as well as modulated traveling pulses. We approximate the linear stability of traveling pulses through computations in a finite albeit large domain with periodic boundary conditions. The critical eigenmodes at the onset of the instabilities are related to the resulting spatiotemporal dynamics and act upon the back of the pulses. The first scenario has been analyzed earlier for high excitability resp. low excitation threshold: it involves the collision of a stable pulse branch with an unstable pulse branch in a so called T-point.