Abstract:
Excitable media, such as nerve, heart and the Belousov-Zhabo- tinsky reaction, exhibit
a large excursion from equilibrium in response to a small but finite perturbation.
Assuming a one-dimensional ring geometry of sufficient length, excitable media support
a periodic wave of circulation. As in the periodic stimulation of oscillations in
ordinary differential equations, the effects of periodic stimuli of the periodically
circulating wave can be described by a one-dimensional Poincaré map. Depending on
the period and intensity of the stimulus as well as its initial phase, either entrainment
or termination of the original circulating wave is observed. These phenomena are directly
related to clinical observations concerning periodic stimulation of a class of cardiac
arrhythmias caused by reentrant wave propagation in the human heart.
Keywords:
Cardiac Tachycardias - Excitable Media - Reentry - Wave Propagation
