THE OUTCOME OF A STOCHASTIC EPIDEMIC—A NOTE ON BAILEY'S PAPER

Abstract

In a recent paper (1953) N. Bailey has considered a stochastic epidemic model of the type set up by Bartlett (1949), and has shown that the probability distribution (P_w) of the ultimate number of infected individuals (w) may be calculated by solving a certain set of doubly recurrent relations. I propose to show that for quite a general case these same probabilities may be obtained by the solution of a set of singly recurrent relations (eqs. (17) and (24)). Furthermore, an expression may be derived (eqs. (38) and (40)) for the probability that an infection introduced into a large population will ‘take’—this provides a stochastic equivalent to Kermack & McKendrick's threshold theorem (1927 and later).