Small Stable Groups and Generics

Journal of Symbolic Logic 56 (3):1026-1037 (1991)
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Abstract

We define an $\mathfrak{R}$-group to be a stable group with the property that a generic element can only be algebraic over a generic. We then derive some corollaries for $\mathfrak{R}$-groups and fields, and prove a decomposition theorem and a field theorem. As a nonsuperstable example, we prove that small stable groups are $\mathfrak{R}$-groups.

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10.2307/2275070

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Citations of this work

The model theory of unitriangular groups.Oleg V. Belegradek - 1994 - Annals of Pure and Applied Logic 68 (3):225-261.
Nilpotent complements and Carter subgroups in stable ℜ-groups.Frank O. Wagner - 1994 - Archive for Mathematical Logic 33 (1):23-34.
Small skew fields.Cédric Milliet - 2007 - Mathematical Logic Quarterly 53 (1):86-90.
Another stable group.Andreas Baudisch - 1996 - Annals of Pure and Applied Logic 80 (2):109-138.

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References found in this work

Superstable groups.Ch Berline & D. Lascar - 1986 - Annals of Pure and Applied Logic 30 (1):1-43.
Superstable fields and groups.G. Cherlin - 1980 - Annals of Mathematical Logic 18 (3):227.
Semisimple stable and superstable groups.J. T. Baldwin & A. Pillay - 1989 - Annals of Pure and Applied Logic 45 (2):105-127.

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