Basic properties and prediction of max-ARMA processes

Abstract

A max-autoregressive moving average (MARMA(p, q)) process {X_t} satisfies the recursion for all t where φ _i, , and {Z_t} is i.i.d. with common distribution function Φ_1,σ (X): = exp {–σ x^–1} for . Such processes have finite-dimensional distributions which are max-stable and hence are examples of max-stable processes. We provide necessary and sufficient conditions for existence of a stationary solution to the MARMA recursion and we examine the reducibility of the process to a MARMA(p′, q′) with p′ or q′ < q. After introducing a natural metric between two jointly max-stable random variables, we consider the prediction problem for MARMA processes. Assuming that X₁, …, X_n have been observed, we restrict our class of predictors to be max-linear, i.e. of the form , and find b₁, …, b_n to minimize the distance between this predictor and X_n+k for k 1. The optimality criterion is designed to minimize the probability of large errors and is similar in spirit to the dispersion criterion adopted in Cline and Brockwell (Stoch. Proc. Appl. 19 (1985), 281-296) for the prediction of ARMA processes with stable noise. Most of our results remain valid for the case when the distribution of Z₁ is only in the domain of attraction of Φ_1,σ. In addition, we give a naive estimation procedure for the φ 's and the θ 's which, with probability 1, identifies the true parameter values exactly for n sufficiently large.