Generalized Discrete Spherical Harmonic Transforms

We extend the applicability of the discrete Bessel transform we have previously derived for the case of cylindrical or spherical symmetry. In the absence of symmetry we describe the fixed-grid algorithm which optimally deals with non-direct product rep resentations. Exponential convergence is preser

The discrete transformation LF x s f x s Ý 2n q 1 r2 P x F n , ns0 n Ž . where the P x 's denote the well-known Legendre polynomials, is an isomorphism n Ž . between the space L ‫ގ‬ of the complex-valued sequences of rapid descent and 0 ## Ž . the space L L y1, 1 of all infinitely differentiable

## Abstract We generalize spherical harmonics expansions of scalar functions to expansions of alternating differential forms (‘__q__‐forms’). To this end we develop a calculus for the use of spherical co‐ordinates for __q__‐forms and determine the eigen‐__q__‐forms of the Beltrami‐operator on __S__