How can I determine $$Aut(\Bbb Z_{2} \oplus \Bbb Z_{2})?$$ Is $$Aut(\Bbb Z_{2} \oplus \Bbb Z_{2})\equiv S{3}?$$ Generators goes to generator under automorphism. There are 3 elements in$(\Bbb Z_{2} \oplus \Bbb Z_{2})$ of order 2. But I can get any conclusions from this concept.
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Hint: $\mathbb Z_2 \oplus \mathbb Z_2$ is a $\mathbb Z_2$ vector space with basis $(1,0),(0,1)$.
Stefan Mesken
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