Transformed rank-1 lattices for high-dimensional approximation

Abstract

This paper describes an extension of Fourier approximation methods for multivariate functions defined on the torus Td to functions in a weighted Hilbert space L2(Rd, ω) via a multivariate change of variables :(-12,12)dd. We establish sufficient conditions on and ω such that the composition of a function in such a weighted Hilbert space with yields a function in the Sobolev space Hmixm(Td) of functions on the torus with mixed smoothness of natural order m ∈ N0. In this approach we adapt algorithms for the evaluation and reconstruction of multivariate trigonometric polynomials on the torus Td based on single and multiple reconstructing rank-1 lattices. Since in applications it may be difficult to choose a related function space, we make use of dimension incremental construction methods for sparse frequency sets. Various numerical tests confirm obtained theoretical results for the transformed methods.