On E-Discretization of Tori of Compact Simple Lie Groups

Abstract

Three types of numerical data are provided for compact simple Lie groups G of classical types and of any rank. This data is indispensable for Fourier-like expansions of multidimensional digital data into finite series of E-functions on the fundamental domain Fe. Firstly, we determine the number |FeM| of points in Fe from the lattice PM, which is the refinement of the dual weight lattice P of G by a positive integer M. Secondly, we find the lowest set eM of the weights, specifying the maximal set of E-functions that are pairwise orthogonal on the point set FeM. Finally, we describe an efficient algorithm for finding the number of conjugate points to every point of FeM. Discrete E-transform, together with its continuous interpolation, is presented in full generality.