Approximating Shepp's constants for the Slepian process

Abstract

Slepian process S(t) is a stationary Gaussian process with zero mean and covariance E S(t)S(t')=\0,1-|t-t'|\\, . For any T>0 and h>0, define FT(h ) = Pr\t ∈ [0,T] S(t) < h \ and the constants (h) = -T ∞ 1T FT(h) and λ(h)=\-(h) \; we will call them `Shepp's constants'. The aim of the paper is construction of accurate approximations for FT(h) and hence for the Shepp's constants. We demonstrate that at least some of the approximations are extremely accurate.