nLab Dickson invariant

Redirected from "Dickson invariants".

Definition

Let $q$ be a prime power, $V$ a vector space of dimension $n$ over the finite field $\mathbf{F}_q$ , and $\mathbf {G L}(V)$ , the general linear group of invertible linear transformations on $V$ .

The ring of Dickson invariants is defined as the $GL(V)$ -invariants $Sym(V)^{\mathbf{G L}(V)}$ in the symmetric algebra on $V$ .

This is a graded polynomial algebra on $n$ variables. The degrees of the generators are $q^n - q^i$ for $i=0,\dots,n-1$ .

The infinity-groups whose classifying spaces/deloopings have mod 2 ordinary cohomology given by rank $n$ Dickson invariants are precisely these 4 of which the first three are compact Lie groups and the last one in a 2-compact group:

$n=$	1	2	3	4
$DI(n)=$	Z/2	SO(3)	G2	G3

Clarence Wilkerson: A primer on Dickson invariants, in Haynes Miller, Stewart Priddy (eds.): Proceedings of the Northwestern Homotopy Theory Conference (1983) [doi:10.1090/conm/019, pdf]
William Dwyer, Clarence Wilkerson: A new finite loop space at the prime two, J. Amer. Math. Soc. 6 (1993) 37-64 [doi:10.1090/S0894-0347-1993-1161306-9]

Last revised on May 9, 2026 at 13:39:22. See the history of this page for a list of all contributions to it.