Let G be a finite group. Let T

Santos Mooney

Santos Mooney

Answered question

2022-04-14

Let G be a finite group. Let T be an element of Aut(G) such that
T2=I, and xT=xx=e.
Then, G is abelian.

Answer & Explanation

Frain4i62

Frain4i62

Beginner2022-04-15Added 16 answers

Step 1
My solution of this problem is the following:
Let ϕ be a mapping ϕ:Gnixx1(xT)G
If ϕ(x)=ϕ(y), then x1(xT)=y1(yT)
Then, (xT)(y1T)=xy1
Then, (xy1)T=xy1
By the assumption of Problem 10, xy1=e
So, x=y
So, ϕ is injective.
Since G is a finite set, ϕ is also surjective.
So, for every gG, there exists xG such that g=x1(xT)
Step 2
Let g be an arbitrary element of G.
Then, by Problem 10, there exists xG such that g=x1(xT)
Then,
gT=(x1(xT))T=(x1T)(xT2)=(xT)1(xI)=(xT)1x
=(x1(xT))1=g1
So, gT=g1 holds for every gG
Let a, b be arbitrary two elements of G.
Then, (ab)1=(ab)T=(aT)(bT)=a1b1=(ba)1
So, ab=ba

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