General semilinear group of degree one
Definition
Let be a field. The general semilinear group of degree one over , denoted , is defined as the general semilinear group of degree one over . Explicitly, it is the external semidirect product:
where is the multiplicative group of , is the prime subfield of , and denotes the Galois group of over .
If is a finite field of size , this group is written as .
Particular cases
For a finite field
Suppose is a finite field of size , where is a prime power with underlying prime , so that for a positive integer . is the characteristic of .
Then, is a metacyclic group of order with presentation:
(here denotes the identity element).