Lecture Notes on Stationary Gamma Processes

Abstract

For each λ>0 and every square-integrable infinitely-divisible (ID) distribution there exists at least one stationary stochastic process t Xt with the specified distribution for X1 and with first-order autoregressive (AR(1)) structure in the sense that the autocorrelation of Xs and Xt is (-λ|s-t|) for all indices s,t. For the special case of the standard Normal distribution, the process Xt is unique -- namely, the first-order autoregressive Ornstein-Uhlenbeck velocity process. The process Xt is also uniquely determined if X1 is accorded the unit rate Poisson distribution. For the Gamma distribution, however, Xt is not determined uniquely. In these lecture notes we describe six distinct processes with the same univariate marginal distributions and AR(1) autocorrelation function. We explore a few of their properties and describe methods of simulating their sample paths.