Average Case tractability of multivariate approximation with Gaussian kernels

Abstract

We study the problem of approximating functions of d variables in the average case setting for the L2 space L2,d with the standard Gaussian weight equipped with a zero-mean Gaussian measure. The covariance kernel of this Gaussian measure takes the form of a Gaussian kernel with non-increasing positive shape parameters γj2 for j = 1, 2, …, d. The error of approximation is defined in the norm of L2,d. We study the average case error of algorithms that use at most n arbitrary continuous linear functionals. The information complexity n(, d) is defined as the minimal number of linear functionals which are needed to find an algorithm whose average case error is at most . We study different notions of tractability or exponentially-convergent tractability (EC-tractability) which the information complexity n(, d) describe how behaves as a function of d and -1 or as one of d and (1+-1). We find necessary and sufficient conditions on various notions of tractability and EC-tractability in terms of shape parameters. In particular, for any positive s>0 and t∈(0,1) we obtain that the sufficient and necessary condition on γ2 j for which d+-1∞n(,d)-s+dt=0 holds is j ∞j1-tγj2\,+ γj-2=0,where + x=(1, x).