Asymptotic and pre-asymptotic convergence of sparse grids for anisotropic kernel interpolation

Abstract

Sparse grids are popular tools for high-dimensional function approximation. In this work, we study the use of sparse grids for interpolation using separable Mat\'ern kernels ,λ(x,x')=Πj=1dφ_j,λj(xj,xj'), with a particular focus on the anisotropic setting where the regularity j and the lengthscale λj vary with dimension j. We combine the construction of anisotropic sparse grids, which exploit anisotropic j to improve convergence rates in smooth dimensions, with the construction of lengthscale-informed sparse grids, which diminish the error contribution of less varying dimensions using anisotropic λj. We provide theory and numerical experiments to showcase the benefits on asymptotic and pre-asymptotic error behaviour of sparse grid kernel interpolation.