English

Fast multilevel sparse Gaussian kernels for high-dimensional approximation and integration

Numerical Analysis 2015-01-15 v1

Abstract

A fast multilevel algorithm based on directionally scaled tensor-product Gaussian kernels on structured sparse grids is proposed for interpolation of high-dimensional functions and for the numerical integration of high-dimensional integrals. The algorithm is based on the recent Multilevel Sparse Kernel-based Interpolation (MLSKI) method (Georgoulis, Levesley \& Subhan, \emph{SIAM J. Sci. Comput.}, 35(2), pp.~A815--A831, 2013), with particular focus on the fast implementation of Gaussian-based MLSKI for interpolation and integration problems of high-dimen-sional functions f:[0,1]dRf:[0,1]^d\to\mathbb{R}, with 5d105\le d\le 10. The MLSKI interpolation procedure is shown to be interpolatory and a fast implementation is proposed. More specifically, exploiting the tensor-product nature of anisotropic Gaussian kernels, one-dimensional cardinal basis functions on a sequence of hierarchical equidistant nodes are precomputed to machine precision, rendering the interpolation problem into a fully parallelisable ensemble of linear combinations of function evaluations. A numerical integration algorithm is also proposed, based on interpolating the (high-dimensional) integrand. A series of numerical experiments highlights the applicability of the proposed algorithm for interpolation and integration for up to 10-dimensional problems.

Keywords

Cite

@article{arxiv.1501.03296,
  title  = {Fast multilevel sparse Gaussian kernels for high-dimensional approximation and integration},
  author = {Zhaonan Dong and Emmanuil H. Georgoulis and Jeremy Levesley and Fuat Usta},
  journal= {arXiv preprint arXiv:1501.03296},
  year   = {2015}
}
R2 v1 2026-06-22T08:00:54.692Z