Stability results assuming tameness, monster model and continuity of nonsplitting
Abstract
Assuming the existence of a monster model, tameness and continuity of nonsplitting in an abstract elementary class (AEC), we extend known superstability results: let μ>LS( K) be a regular stability cardinal and let be the local character of μ-nonsplitting. The following holds: 1. When μ-nonforking is restricted to (μ,≥)-limit models ordered by universal extensions, it enjoys invariance, monotonicity, uniqueness, existence, extension and continuity. It also has local character . This generalizes Vasey's result which assumed μ-superstability to obtain same properties but with local character 0. 2. There is λ∈[μ,h(μ)) such that if K is stable in every cardinal between μ and λ, then K has μ-symmetry while μ-nonforking in (1) has symmetry. In this case (a) K has the uniqueness of (μ,≥)-limit models: if M1,M2 are both (μ,≥)-limit over some M0∈ Kμ, then M1M0M2; (b) any increasing chain of μ+-saturated models of length ≥ has a μ+-saturated union. These generalize VanDieren-Vasey's result and remove the symmetry assumption in Boney-VanDieren and Vasey's result. Under (<μ)-tameness, the conclusions of (1), (2)(a)(b) are equivalent to K having the -local character of μ-nonsplitting. Grossberg and Vasey gave eventual superstability criteria for tame AECs with a monster model. We remove the high cardinal threshold and reduce the cardinal jump between equivalent superstability criteria. We also add two new superstability criteria to the list: a weaker version of solvability and the boundedness of the U-rank.
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