Answer to Question #300207 in Abstract Algebra for ksmoorthy

Question #300207

If G is the abelian group of integers in the m apping T: G → G given by T(x ) = x then prove that as an autom orphism

Expert's answer

Let us prove that the mapping "T: G \u2192 G" given by "T(x ) = x" is an automorphism.

Since "T(xy)=xy=T(x)T(y)" for any "x,y\\in G," we conclude that the mapping is a homomorphism. If "T(x)=T(y)" then "x=y," and thus the mapping "T" is injective. For any "y\\in G," we have that "T(y)=y," and thus "T" is a surjection. We conclude that "T" is an automorphism.

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Answer to Question #300207 in Abstract Algebra for ksmoorthy

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