Abstract
Reentry was induced in a 1-dimensional ring model of cardiac myocytes using a modified Beeler-Reuter representation. In this setting, reentry, with one activation front, traveling around the ring, is periodic when the length (L) of the ring is longer than a critical value L/sub crit/, and quasiperiodic for L/sub crit/>L/spl ges/L/sub min/, the minimal length with sustained reentry. When L>2L/sub min/, sustained reentries with two activation fronts traveling simultaneously around the ring also exist. These are quasiperiodic if 2L/sub crit/>L>2L/sub min/, and periodic if L>2L/sub crit/. We have studied the conditions under which a pair of coupled stimuli can induce either a resetting or an annihilation of the one-front reentry, or a transition from one-front to two-fronts reentry. We show how the outcome of the stimulations depends on the relative timing of the pulses and on the length of the circuit by providing a global description of the dynamics as a function of these parameters. We also show that it can be understood by the interaction of the dynamics of repolarisation and of the speed of propagation, since a simplified integral delay model based on these properties reproduces the behavior of the ionic model.
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