Discrete math Group - Isomorphism and Automorphism. Let G be a Cyclic group. Prove or disprove: A.let a,b in G so the function f:G rightarrow G,f(a^k)=b^k is Automorphism of G(which means G is Isomorphism to herself)

Jonah Jacobson

Jonah Jacobson

Answered question

2022-09-07

Discrete math Group - Isomorphism and Automorphism
Let G be a Cyclic group
Prove or disprove: A.let a , b G so the function f : G G , f ( a k ) = b k is Automorphism of G(which means G is Isomorphism to herself)
B.let a,b generators of G so the function f : G G , f ( a k ) = b k is Automorphism of G(which means G is Isomorphism to herself)

Answer & Explanation

Mohammed Farley

Mohammed Farley

Beginner2022-09-08Added 15 answers

Step 1
To disprove the first statement, find a counterexample.
Here's one: take G={0,1,2} with addition modulo 3. Define
f ( k ) = f ( k 0 ) = f ( 1 + + 1 ) = 0 + + 0 = 0
Step 2
That is, f ( g ) = 0 for all g G. Show that f is a homomorphism but not an isomorphism.
To prove the second statement: follow the usual steps. That is, show that f is a homomorphism that is both one to one (injective) and onto (surjective).

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