Self-organization of oscillation in an epidemic model for COVID-19

Abstract

On the basis of a compartment model, the epidemic curve is investigated when the net rate λ of change of the number of infected individuals I is given by an ellipse in the λ-I plane which is supported in [I, Ih]. With a (Ih - I)/(Ih + I), it is shown that (1) when a < 1 or I >0, oscillation of the infection curve is self-organized and the period of the oscillation is in proportion to the ratio of the difference (Ih - I) and the geometric mean Ih I of Ih and I, (2) when a = 1, the infection curve shows a critical behavior where it decays obeying a power law function with exponent -2 in the long time limit after a peak, and (3) when a > 1, the infection curve decays exponentially in the long time limit after a peak. The present result indicates that the pandemic can be controlled by a measure which makes I < 0.

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