A circle map in a human heart
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[1] John J. Tyson,et al. When Time Breaks Down: The Three‐Dimensional Dynamics of Electrochemical Waves and Cardiac Arrhythmias , 1988 .
[2] Albert Libchaber,et al. Quasi-Periodicity and Dynamical Systems: An Experimentalist's View , 1988 .
[3] M. N. Levy,et al. Concealed ventricular premature complexes in a population sample. , 1986, The American journal of cardiology.
[4] L. Glass,et al. UNIVERSALITY AND SELF-SIMILARITY IN THE BIFURCATIONS OF CIRCLE MAPS , 1985 .
[5] L. Glass,et al. Global bifurcations of a periodically forced biological oscillator , 1984 .
[6] T Sato,et al. Difference equation model of ventricular parasystole as an interaction between cardiac pacemakers based on the phase response curve. , 1983, Journal of theoretical biology.
[7] L. Glass,et al. Phase locking, period-doubling bifurcations, and irregular dynamics in periodically stimulated cardiac cells. , 1981, Science.
[8] Ian Richards,et al. Continued Fractions Without Tears , 1981 .
[9] J Jalife,et al. A Mathematical Model of Parasystole and its Application to Clinical Arrhythmias , 1977, Circulation.
[10] G. A. Hedlund,et al. Sturmian Minimal Sets , 1944 .
[11] L. Glass,et al. From Clocks to Chaos: The Rhythms of Life , 1988 .
[12] Vladimir Igorevich Arnold,et al. Geometrical Methods in the Theory of Ordinary Differential Equations , 1983 .