English

Riemann localisation on the sphere

Classical Analysis and ODEs 2016-07-14 v2

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 SdRd+1\mathbb{S}^{d}\subset\mathbb{R}^{d+1}, d2d\ge2, we mean that for a suitable subset XX of Lp(Sd)\mathbb{L}_{p}(\mathbb{S}^{d}), 1p1\le p\le \infty, the Lp\mathbb{L}_{p}-norm of the Fourier local convolution of fXf\in X converges to zero as the degree goes to infinity. The Fourier local convolution of ff at xSd\boldsymbol{x}\in\mathbb{S}^{d} is the Fourier convolution with a modified version of ff obtained by replacing values of ff by zero on a neighbourhood of x\boldsymbol{x}. The failure of Riemann localisation for d>2d>2 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.

Keywords

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

R2 v1 2026-06-22T11:27:14.016Z