English

Needlet approximation for isotropic random fields on the sphere

Numerical Analysis 2016-12-13 v2 Probability

Abstract

In this paper we establish a multiscale approximation for random fields on the sphere using spherical needlets --- a class of spherical wavelets. We prove that the semidiscrete needlet decomposition converges in mean and pointwise senses for weakly isotropic random fields on Sd\mathbb{S}^{d}, d2d\ge2. For numerical implementation, we construct a fully discrete needlet approximation of a smooth 22-weakly isotropic random field on Sd\mathbb{S}^{d} and prove that the approximation error for fully discrete needlets has the same convergence order as that for semidiscrete needlets. Numerical examples are carried out for fully discrete needlet approximations of Gaussian random fields and compared to a discrete version of the truncated Fourier expansion.

Keywords

Cite

@article{arxiv.1512.07790,
  title  = {Needlet approximation for isotropic random fields on the sphere},
  author = {Quoc T. Le Gia and Ian H. Sloan and Yu Guang Wang and Robert S. Womerlsey},
  journal= {arXiv preprint arXiv:1512.07790},
  year   = {2016}
}

Comments

28 pages, 8 figures, added an illustration of an advantage of needlet approximations which allow local concentration of nodes in regions of most interests

R2 v1 2026-06-22T12:17:31.405Z