NECESSARY AND SUFFICIENT CONDITIONS FOR ASYMPTOTICALLY OPTIMAL LINEAR PREDICTION OF RANDOM FIELDS ON COMPACT METRIC SPACES
成果类型:
Article
署名作者:
Kirchner, Kristin; Bolin, David
署名单位:
Delft University of Technology; King Abdullah University of Science & Technology
刊物名称:
ANNALS OF STATISTICS
ISSN/ISSBN:
0090-5364
DOI:
10.1214/21-AOS2138
发表日期:
2022
页码:
1038-1065
关键词:
isotropic covariance functions
摘要:
Optimal linear prediction (aka. kriging) of a random field {Z(x)}(x is an element of X )indexed by a compact metric space (X, d(X)) can be obtained if the mean value function m : chi -> R and the covariance function Q: X x X -> R of Z are known. We consider the problem of predicting the value of Z (x*) at some location x* is an element of X based on observations at locations {x(j)}(j=1)(n), which accumulate at x* as n -> infinity (or, more generally, predicting phi(Z) based on {phi(j)(Z)}(j=i)(n) for linear functionals phi, phi(1), ..., phi(n)). Our main result characterizes the asymptotic performance of linear predictors (as n increases) based on an incorrect second-order structure ((m) over tilde, (rho) over tilde), without any restrictive assumptions on rho, (rho) over tilde such as stationarity. We, for the first time, provide necessary and sufficient conditions on ((m) over tilde, (rho) over tilde) for asymptotic optimality of the corresponding linear predictor holding uniformly with respect to phi. These general results are illustrated by weakly stationary random fields on X subset of R-d with Matern or periodic covariance functions, and on the sphere X = S-2 for the case of two isotropic covariance functions.
来源URL: