Functions realising as abelian group automorphisms
Abstract
Let A be a set and f:A→ A a bijective function. Necessary and sufficient conditions on f are determined which makes it possible to endow A with a binary operation * such that (A,*) is a cyclic group and f∈ Aut(A). This result is extended to all abelian groups in case |A|=p2, \ p a prime. Finally, in case A is countably infinite, those f for which it is possible to turn A into a group (A,*) isomorphic to Zn for some n 1, and with f∈ Aut (A), are completely characterised.
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