A Mathematical Model of Population Growth as a Queuing System
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In this article, a new mathematical model of human population growth as an autonomous non-Markov queuing system with an unlimited number of servers and two types of applications is proposed. The research of this system was carried out a virtual phase method and a modified method of asymptotic analysis of a stochastic age-specific density for a number of applications served in the system at time t and was proofed that the asymptotic distribution is Gaussian. The main probabilistic characteristics of this distribution are found. The mathematical model and methods of its research can be applied to the analysis of the population growth both in a single country and around the world.
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