Spin-s Spherical Harmonics and ð

Abstract

Recent work on the Bondi‐Metzner‐Sachs group introduced a class of functions _sY_lm(θ, φ) defined on the sphere and a related differential operator ð. In this paper the _sY_lm are related to the representation matrices of the rotation group R₃ and the properties of ð are derived from its relationship to an angular‐momentum raising operator. The relationship of the _sT_lm(θ, φ) to the spherical harmonics of R₄ is also indicated. Finally using the relationship of the Lorentz group to the conformal group of the sphere, the behavior of the _sT_lm under this latter group is shown to realize a representation of the Lorentz group.