Geometric sums, size biasing and zero biasing

Abstract

The geometric sum plays a significant role in risk theory and reliability theory Kala97 and a prototypical example of the geometric sum is R\'enyi's theorem~Renyi56 saying a sequence of suitably parameterised geometric sums converges to the exponential distribution. There is extensive study of the accuracy of exponential distribution approximation to the geometric sum Sugakova95,Kala97,PekozRollin11 but there is little study on its natural counterpart of gamma distribution approximation to negative binomial sums. In this note, we show that a nonnegative random variable follows a gamma distribution if and only if its size biasing equals its zero biasing. We combine this characterisation with Stein's method to establish simple bounds for gamma distribution approximation to the sum of nonnegative independent random variables, a class of compound Poisson distributions and the negative binomial sum of random variables.

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