Abstract
We study limit models in the class of abelian groups with the subgroup relation and in the class of torsion-free abelian groups with the pure subgroup relation. We show: Theorem 0.1(1)If G is a limit model of cardinality λ in the class of abelian groups with the subgroup relation, thenG≅(⊕λQ)⊕⊕pprime(⊕λZ(p∞)).(2)If G is a limit model of cardinality λ in the class of torsion-free abelian groups with the pure subgroup relation, then:•If the length of the chain has uncountable cofinality, thenG≅(⊕λQ)⊕Πpprime(⊕λZ(p))‾.•If the length of the chain has countable cofinality, then G is not algebraically compact. We also study the class of finitely Butler groups with the pure subgroup relation, we show that it is an AEC, Galois-stable and (<ℵ0)-tame and short.
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