SERIES EXPANSIONS FOR THE PROPERTIES OF A BIRTH PROCESS OF CONTROLLED VARIABILITY
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A birth process is studied in which the birth rate at any time is a function of the difference between the current population size and a target corresponding to unit growth rate. If this controlling function is a decreasing function of its argument a stabilizing effect is to be expected. By supposing that the controlling function varies very slowly, series expansions for the properties of the process are obtained, the leading term corresponding to a diffusion approximation. The sequence of births considered as a point process of controlled variability is examined and approximations to the interval distribution and covariance density obtained. BIRTH PROCESS; CONTROLLED VARIABILITY; DIFFUSION; POINT PROCESS; TAKACS PROCESS
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