Irreducible representations of a parafield and the connection of the parafield with usual fields

With the help of a new representation of the Lorentz group in terms of complex relativistic Euler angles we determine a specific set of finite-dimensional vector spaces irreducible under Lorentz transfol•mations. If we further associate every elementary particle family with such a space we obtain a

## Abstract It is shown how the irreducible representations of a finite group can be calculated from the irreducible characters (the latter can be calculated exactly by using Dixon's method). All elements of the matrix, representing a group element, lie in the rational field of polynomials of ξ = e

## Abstract The restriction on a method for computing irreducible representations of finite groups, requiring that in the irreducible representation to be constructed, at least one group element has at least one nondegenerate eigenvalue, is removed. The method is thus shown to be applicable to an a