Limit Groups and Automorphisms of -Existentially Closed Groups

Abstract

The structure of automorphism groups of -existentially closed groups are studied by Kaya-Kuzucuoglu in 2022. It was proved that Aut(G) is the union of subgroups of level preserving automorphisms and |Aut(G)|=2 whenever is an inaccessible cardinal and G is the unique -existentially closed group of cardinality . The cardinality of the automorphism group of a -existentially closed group of cardinality λ> is asked in Kourovka Notebook Question 20.40. Here we answer positively the promised case =λ namely: If G is a -existentially closed group of cardinality , then |Aut(G)|=2. We also answer Kegel's question on universal groups, namely: For any uncountable cardinal , there exist universal groups of cardinality .