Asymptotic Vanishing of Stiefel--Whitney Classes for GLn(Fq)

Abstract

We study the asymptotic behavior of Stiefel--Whitney classes of irreducible orthogonal representations of the finite general linear groups GLn(Fq). Building on recent formulas expressing these classes in terms of character values at elements of order dividing 2, we relate questions about characteristic classes to problems of 2-adic divisibility of character values. For fixed odd q, we show that as n ∞, the values of irreducible orthogonal characters become highly divisible by powers of 2 for almost all representations. As a consequence, the proportion of irreducible orthogonal representations with trivial first and second Stiefel--Whitney classes tends to 1, and if q 1 4, the same holds for the fourth Stiefel--Whitney class. In particular, almost all orthogonal representations are spinorial in the large rank limit. In contrast, when the rank is fixed and q ∞, the behavior is markedly different. Focusing on GL2(Fq), we show that the second Stiefel--Whitney class vanishes with limiting probability 3/8 among irreducible orthogonal representations.