
doi: 10.1007/bf01174805
If G is a group we will write Aut G for the group of all automorphisms of G and Inn G for the normal subgroup of all inner automorphisms of G. Many authors have studied the relationship between the structure of G and that of Aut G, in particular when the latter is finite. This paper is a further contribution to this study. The first results on groups whose automorphism groups are finite were published by Baer in a paper [2] in which he proved that a torsion group has finite automorphism group only if it is finite. Baer also proved that a group with only a finite number of endomorphisms is finite. In 1962 Alperin [1] characterized finitely generated groups with finitely many automorphisms as finite central extensions of cyclic groups. Nagrebeckil [9] discovered in 1972 the important result that in any group with finitely many automorphisms the elements of finite order form a finite subgroup. This of course generalizes Baer's original result. Robinson El0] has given another proof of Nagrebeckfi's Theorem as well as obtaining information on the primes dividing the order of the maximal torsion subgroup. He also characterized the center of a group whose automorphism group is finite and gave a general method for constructing examples. On the other hand there seems to be little hope of obtaining a useful classification of groups whose automorphism groups are finite, even in the abelian case. Indeed, it has been shown be several authors that torsion-free abelian groups with only one non-trivial automorphism the involution x F--~x~ are relatively common (de Groot [5], Fuchs [4], Corner [3]). However, Hallett and Hirsch have adopted a different approach, asking which finite groups can occur as the automorphism groups of torsion-free abelian groups. They have established the following definitive result [-7, 8]:
Finite abelian groups, automorphism groups of infinite groups, Automorphisms, homomorphisms, endomorphisms, etc. for abelian groups, FINITE ABELIAN GROUPS BEING AUTOMORPHISM GROUPS OF INFINITE GROUPS, Article, elementary abelian p-groups, Automorphisms of infinite groups, 510.mathematics, Automorphism groups of groups, Representations of groups as automorphism groups of algebraic systems
Finite abelian groups, automorphism groups of infinite groups, Automorphisms, homomorphisms, endomorphisms, etc. for abelian groups, FINITE ABELIAN GROUPS BEING AUTOMORPHISM GROUPS OF INFINITE GROUPS, Article, elementary abelian p-groups, Automorphisms of infinite groups, 510.mathematics, Automorphism groups of groups, Representations of groups as automorphism groups of algebraic systems
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