On the problem of stability of abstract elementary classes of modules
Abstract
It is an open problem of Mazari-Armida whether every abstract elementary class of R-modules (K, ≤pure), with ≤pure the pure submodule relation, is stable. We answer this question in the negative by constructing unstable abstract elementary classes (K, ≤pure) of torsion-free abelian groups. On the other hand, we prove (in ZFC) that if R is any ring and (K, ) is an abstract elementary class of R-modules which is -local (also called -tame) for some ≥ LS(K, ), then (K, ) is almost stable, where almost stability is a new notion of independent interest that we introduce in this paper, and which is equivalent to the usual notion of stability under the assumption of amalgamation. As a consequence, assuming the existence of a strongly compact cardinal , we have that every abstract elementary class (K, ) of R-modules with amalgamation satisfying > LS(K, ) is stable.
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