Riemann localisation on the sphere
Abstract
This paper first shows that the Riemann localisation property holds for the Fourier-Laplace series partial sum for sufficiently smooth functions on the two-dimensional sphere, but does not hold for spheres of higher dimension. By Riemann localisation on the sphere , , we mean that for a suitable subset of , , the -norm of the Fourier local convolution of converges to zero as the degree goes to infinity. The Fourier local convolution of at is the Fourier convolution with a modified version of obtained by replacing values of by zero on a neighbourhood of . The failure of Riemann localisation for can be overcome by considering a filtered version: we prove that for a sphere of any dimension and sufficiently smooth filter the corresponding local convolution always has the Riemann localisation property. Key tools are asymptotic estimates of the Fourier and filtered kernels.
Cite
@article{arxiv.1510.06834,
title = {Riemann localisation on the sphere},
author = {Yu Guang Wang and Ian H. Sloan and Robert S. Womersley},
journal= {arXiv preprint arXiv:1510.06834},
year = {2016}
}
Comments
38 pages, simplify the proof of Theorem 3.2