Expectation thinning operators based on linear fractional probability generating functions

Abstract

We introduce a two-parameter expectation thinning operator based on a linear fractional probability generating function. The operator is then used to define a first-order integer-valued autoregressive ∈ar1 process. Distributional properties of the ∈ar1 process are described. We revisit the Bernoulli-geometric ∈ar1 process of Bourguignon and Wei (2017) and we introduce a new stationary ∈ar1 process with a compound negative binomial distribution. Lastly, we show how a proper randomization of our operator leads to a generalized notion of monotonicity for distributions on .