Abstract
Introduction. In this paper we show how to calculate the irreducible characters of the group GL(n, q) of all nonsingular matrices of degree n with coefficients in the finite field of q elements. These characters have been given for n = 2 by H. Jordan [8], Schur [10], and others, and for n =3 and n =4 by Steinberg [12], who has also [13] done important work in the general case. We are concerned here with characters, that is, characters of representations by matrices with complex coefficients. Let Xi, * * *, XA be the distinct absolutely irreducible ordinary characters of a group 5 of order g. By a of 6 (often called a generalised character or difference character) we mean a class-function 4 on 5 of the form
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