An Optimal-Dimensionality Sampling for Spin-s Functions on the Sphere

Abstract

For the representation of spin-s band-limited functions on the sphere, we propose a sampling scheme with optimal number of samples equal to the number of degrees of freedom of the function in harmonic space. In comparison to the existing sampling designs, which require 2L2 samples for the representation of spin-s functions band-limited at L, the proposed scheme requires No=L2-s2 samples for the accurate computation of the spin-s spherical harmonic transform~(s-SHT). For the proposed sampling scheme, we also develop a method to compute the s-SHT. We place the samples in our design scheme such that the matrices involved in the computation of s-SHT are well-conditioned. We also present a multi-pass s-SHT to improve the accuracy of the transform. We also show the proposed sampling design exhibits superior geometrical properties compared to existing equiangular and Gauss-Legendre sampling schemes, and enables accurate computation of the s-SHT corroborated through numerical experiments.