Kernel approximations of a wiener process

Suppose a two-dimensional spatial process z(x) with generalized covariance function G(x, x') c( Ixx'l 2 log Ix -x' I (Matheron, 1973, Adv. in Appl. Probab., 5, 439-468) is observed with error at a number of locations. This paper gives a kernel approximation to the optimal linear predictor, or krigin

The key step in the Wiener-Hopf technique involves the factorization of a kernel function K(α), analytic in a strip D, into a product K + (α)K -(α), where K ± (α) are analytic in upper and lower halves R ± of the complex α-plane overlapping in the strip D, are free of zeros in R ± and have algebraic

We give an approximation in law of the d-parameter Wiener process by processes constructed from a Poisson process with parameter in R d . This approximation is an extension of previous results of Stroock (1982, Topics in Stochastic Di erential Equations, Springer, Berlin) and Bardina and Jolis (2000