μ-abstract elementary classes of modules

Abstract

We prove several new results in the theory of μ-AECs, focusing mainly on (almost) stability, with the primary objective of undertaking a systematic study of μ-AECs of R-modules. Our main results are the following. 1. We show that, under suitable syntactic assumptions, all tame μ-AECs of R-modules (where R is a ring) are almost stable, and are stable if they additionally satisfy a strong amalgamation property. This extends the work of the second author and Shelah [49] to the setting of μ-AECs. 2. We then turn to applications to concrete μ-AECs of R-modules. Our main result in this direction is that (R-Mod, ≤ppμ) has a stable independence relation and is a stable and tame μ-AEC, where ≤ppμ denotes the μ-pure submodule relation. We also prove similar stability results for various classes of abelian groups, including the 1-AEC of torsion-free abelian groups with the balanced subgroup relation. Moreover, we prove the almost stability of all μ-AECs of modules of the form (R-Mod, ), where refines the direct summand relation and satisfies a strong form of coherence. 3. Finally, we study μ-AECs of the form (K, ≤), where K is a class of pure-injective R-modules (note that this is, in general, not an AEC), and use our results to show that, for many natural choices of K, the class (K, ≤) has a stable independence relation and is therefore stable and tame. We use these results to give a sufficient condition for abstract classes of modules of the form (K, ≤pp) to be stable when K is closed under pure-injective envelopes. This generalizes, by a substantially different proof, results of Mazari-Armida [45].

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