Taylor's Law for some infinitely divisible probabbility distributions from population models

Abstract

In a family of random variables, Taylor's law or Taylor's power law offluctuation scaling is a variance function that gives the variance σ2>0 of a random variable (rv) X with expectation μ >0 as a powerof μ: σ 2=Aμ b for finite real A>0,\ b that are thesame for all rvs in the family. Equivalently, TL holds when σ2=a+b μ ,\ a= A, for all rvs in some set. Here we analyze thepossible values of the TL exponent b in five families of infinitelydivisible two-parameter distributions and show how the values of b dependon the parameters of these distributions. The five families areTweedie-Bar-Lev-Enis, negative binomial, compound Poisson-geometric,compound geometric-Poisson (or P\'olya-Aeppli), and gamma distributions.These families arise frequently in empirical data and population models, and they are limit laws of Markov processes that we exhibit in each case.