A star product on the spherical harmonics

A FORTRAN program is presented for the evaluation of the integral of a product of three 6-dimensional spherical harmonics over the surface of the unit 6-sphere. The functions have a classification according to the chain of groups 0(6) ~Sd'(2) x SU(3) ~SO(3) i SO(2), introduced originally by Dragt. T

Novel ideas in harmonic analysis are used to analyze the trapezoidal rule integration for two spheres. Sampling in spherical coordinates links three levels of harmonic analysis. Eigenfunctions of a nonstandard manifold Laplacian descend by restriction, first to a differential graph Laplacian, and th

A simple formula for the spherical multipole tensor which has better scaling behaviour than those based on a cartesian formulation is presented. The interaction energy calculation scales as ~'(L 4) for a multipole expansion up to rank L. A new derivation of the bipolar multipole expansion for well-s

A growth lemma for certain discrete symmetric Laplacians defined on a lattice Z d δ = δZ d ⊂ R d with spacing δ is proved. The lemma implies a De Giorgi theorem, that the harmonic functions for these Laplacians are equi-Hölder continuous, δ → 0. These results are then applied to establish regularity