General semilinear group of degree one

From Groupprops
Revision as of 15:52, 31 May 2012 by Vipul (talk | contribs)

Definition

Let K be a field. The general semilinear group of degree one over K, denoted ΓL(1,K), is defined as the general semilinear group of degree one over K. Explicitly, it is the external semidirect product:

ΓL(1,K)=GL(1,K)Gal(K/k)=KGal(K/k)

where GL(1,K)=K is the multiplicative group of K, k is the prime subfield of K, and Gal(K/k) denotes the Galois group of K over k.

If K is a finite field of size q, this group is written as ΓL(1,q).

Particular cases

For a finite field

Suppose K is a finite field of size q, where q is a prime power with underlying prime p, so that q=pr for a positive integer r. p is the characteristic of K.

Then, ΓL(1,K) is a metacyclic group of order r(q1) with presentation:

a,xaq=a,xr=e,xax1=ap

(here e denotes the identity element).