Determine Group structure of given 2\times2 matrix group over \mathbb{F}_{3}

Maria Huey

Maria Huey

Answered question

2022-01-15

Determine
Group structure of given 2×2 matrix group over F3

Answer & Explanation

Buck Henry

Buck Henry

Beginner2022-01-16Added 33 answers

Step 1
I think that concentrating on the case p=3 and special properties of groups of order 12 isnt
reinosodairyshm

reinosodairyshm

Beginner2022-01-17Added 36 answers

Step 1
I want to determined group structure of
G={(ab0d)a,bF3×,cF3}
Step 2
For finite non-abelian groups of matrices over finite fields one tries to realize the group as a semi direct product of smaller abelian groups:
Let
H={(1c01)cF3}=F3
and
N={(a00b)a,bF3}=(F3)2=(Z(2))2
It follows for any gG, hH that ghg1H hence HG is a normal subgroup and the action σ of G on H is via the character
ρ:GF3
defined by
ρ(g)=ab
You get an action
σ:G×HH
defined by
σ(g,x)=ρ(g)x=abx
with xF3 and a,bF3
Since NH=G and NH={e} you may express G as a semi direct product
G=NH=(F3)2ρ()F3=(Z(2))2ρ()Z(3)
This express G as a semi direct product of two known abelian groups - maybe this is helpful classifying the group. Im
alenahelenash

alenahelenash

Expert2022-01-24Added 556 answers

You have already determined that G is isomorphic to one of D12, Q12 or A4. You have also determined that G has two elements of order 6. As A4 has no elements of order 6, this option is eliminated. The group Q12 has an element of order 4, but G has no elements of order 4. This eliminates Q12, and so GD12.

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