Spectral and circulant approximations to the likelihood for stationary Gaussian random fields

Abstract

Consider a Gaussian random field model on Z d , observed on a rectangular region. Suppose it is desired to estimate a set of parameters in the covariance function. Spectral and circulant approximations to the likelihood are often used to facilitate estimation of the parameters. The purpose of the paper is to give a careful treatment of the quality of these approximations. A spectral approximation for the likelihood was given by Guyon (Biometrika 69 (1982) 95–105) but without proof. The results given here generalize those of Guyon, and fill in the details of the proof. In addition some matrix results are derived which may be of independent interest. Applications are made to Fisher information and bias calculations for maximum likelihood estimates.