Construction of Optimal Algorithms for Function Approximation in Gaussian Sobolev Spaces
Numerical Analysis
2026-03-20 v3 Numerical Analysis
Abstract
This paper studies function approximation in Gaussian Sobolev spaces over the real line and measures the error in a Gaussian-weighted -norm. We construct two linear approximation algorithms using function evaluations that achieve the optimal or almost optimal rate of worst-case convergence in a Gaussian Sobolev space of order . The first algorithm is based on scaled trigonometric interpolation and achieves the optimal rate up to a logarithmic factor. This algorithm can be constructed in almost-linear time with the fast Fourier transform. The second algorithm is more complicated, being based on spline smoothing, but attains the optimal rate .
Cite
@article{arxiv.2402.02917,
title = {Construction of Optimal Algorithms for Function Approximation in Gaussian Sobolev Spaces},
author = {Yuya Suzuki and Toni Karvonen},
journal= {arXiv preprint arXiv:2402.02917},
year = {2026}
}
Comments
19 pages, 2 figures, to appear on BIT Numerical Mathematics