论文信息 - The characters of the finite general linear groups

The characters of the finite general linear groups

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 "ordinary" 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 character of 6 (often called a "generalised character" or "difference character") we mean a class-function 4 on 5 of the form

J. A. Green | J. Green

[1] Robert Steinberg,et al. The Representations of GL(3,q), GL(4,q), PGL(3,q), and PGL(4,q) , 1951, Canadian Journal of Mathematics.

[2] P. Hall,et al. A Contribution to the Theory of Groups of Prime‐Power Order , 1934 .

[3] R. Steinberg,et al. A geometric approach to the representations of the full linear group over a Galois field , 1951 .

[4] Herbert E. Jordan,et al. Group-Characters of Various Types of Linear Groups , 1907 .

[5] J. Schur. Untersuchungen über die Darstellung der endlichen Gruppen durch gebrochene lineare Substitutionen. , 1907 .

[6] Andreas Speiser. Die Theorie der Gruppen von Endlicher Ordnung , 1923 .