Approximation complexity of homogeneous sums of random processes

Abstract

We study approximation properties of additive random fields Yd, d∈N, which are sums of zero-mean random processes with the same continuous covariance functions. The average case approximation complexity nYd() is defined as the minimal number of evaluations of arbitrary linear functionals needed to approximate Yd, with relative 2-average error not exceeding a given threshold ∈(0,1). We investigate the growth of nYd() for arbitrary fixed ∈(0,1) and d∞. The results are applied to sums of standard Wiener processes.