论文信息 - A note on stable sets, groups, and theories with NIP

A note on stable sets, groups, and theories with NIP

Let M be an arbitrary structure. Then we say that an M -formula φ (x) defines a stable set inM if every formula φ (x) ∧ α (x, y) is stable. We prove: If G is an M -definable group and every definable stable subset of G has U -rank at most n (the same n for all sets), then G has a maximal connected stable normal subgroup H such that G /H is purely unstable. The assumptions hold for example if M is interpretable in an o-minimal structure. More generally, an M -definable set X is weakly stable if the M -induced structure on X is stable. We observe that, by results of Shelah, every weakly stable set in theories with NIP is stable. (© 2007 WILEY-VCH Verlag GmbH & Co. KGaA, Weinheim)

Alf Onshuus | Ya'acov Peterzil

[1] Alf Onshuus. Properties and consequences of Thorn-independence , 2006, J. Symb. Log..

[2] Ya'acov Peterzil,et al. Simple algebraic and semialge-braic groups over real-closed elds , 2000 .

[3] 田中克己,et al. ω-stable groups , 1988 .

[4] S. Shelah. CLASSIFICATION THEORY FOR ELEMENTARY CLASSES WITH THE DEPENDENCE PROPERTY-A MODEST BEGINNING , 2004 .

[5] Jerry Gagelman,et al. Stability in geometric theories , 2005, Ann. Pure Appl. Log..

[6] A. Pillay. Geometric Stability Theory , 1996 .

[7] Anand Pillay. Some Remarks on Definable Equivalence Relations in O-Minimal Structures , 1986, J. Symb. Log..

[8] Victor Harnik,et al. Review: S. Shelah, Classification Theory and the Number of Nonisomorphic Models , 1982, Journal of Symbolic Logic.

[9] W. Hodges. CLASSIFICATION THEORY AND THE NUMBER OF NON‐ISOMORPHIC MODELS , 1980 .