The deterministic Kermack-McKendrick model bounds the general stochastic epidemic
Abstract
We prove that, for Poisson transmission and recovery processes, the classic Susceptible Infected Recovered (SIR) epidemic model of Kermack and McKendrick provides, for any given time t>0, a strict lower bound on the expected number of suscpetibles and a strict upper bound on the expected number of recoveries in the general stochastic SIR epidemic. The proof is based on the recent message passing representation of SIR epidemics applied to a complete graph.
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