Isotropic random spin weighted functions on S2 vs isotropic random fields on S3

Abstract

We show that an isotropic random field on SU(2) is not necessarily isotropic as a random field on S3, although the two spaces can be identified. The ambiguity is due to the fact that the notion of isotropy on a group and on a sphere are different, the latter being much stronger. We show that any isotropic random field on S3 is necessarily a superposition of uncorrelated random harmonic homogeneous polynomials, such that the one of degree d is necessarily a superposition of uncorrelated random spin weighted functions of every possible spin weight in the range \-d2,…,d2\, each of which is isotropic in the sense of SU(2). Moreover, for a random field of fixed degree, each spin weight appears with the same magnitude, in a sense to be specified. In addition we will give an overview of the theory of spin weighted functions and Wigner D-matrices, with the purpose of gathering together many different points of view and adding ours. As a byproduct of this survey we will prove some new properties of the Wigner matrices and a formula relating the operators and the horizontal Laplacian of the Hopf fibration S3 S2.