Algebraic Construction of the Basis for the Irreducible Representations of Rotation Groups and for the Homogeneous Lorentz Group

Abstract

The basic functions for a class of the irreducible representations of the rotation groups in n dimensions (R_n) are explicitly constructed by an algebraic method in which the basic functions are taken to be homogeneous polynomials in the variables of E_n. The solutions correspond to the hyperspherical harmonics of the mathematical literature and are of interest for problems exhibiting invariance under a certain R_n. The method is also applied to derive a basis for the infinite‐dimensional irreducible representations of the homogeneous Lorentz group if we then look for homogeneous functions in the variables of the corresponding pseudo‐Euclidean space.