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On solvable centerless groups of Morley rank 3

Published online by Cambridge University Press:  12 March 2014

Mark Kelly Davis
Affiliation:
Department of Mathematics, University of California Irvine, Irvine, California92717, E-mail: mdavis@math.uci.edu
Ali Nesin
Affiliation:
Department of Mathematics, University of California Irvine, Irvine, California92717, E-mail: anesin@math.uci.edu

Extract

We know quite a lot about the general structure of ω-stable solvable centerless groups of finite Morley rank. Abelian groups of finite Morley rank are also well-understood. By comparison, nonabelian nilpotent groups are a mystery except for the following general results:

• An ω1-categorical torsion-free nonabelian nilpotent group is an algebraic group over an algebraically closed field of characteristic 0 [Z3].

• A nilpotent group of finite Morley rank is the central product of a definable subgroup of finite exponent and of a definable divisible subgroup [N3].

• A divisible nilpotent group of finite Morley rank is the direct product of its torsion part (which is central) and of a torsion-free subgroup [N3].

However, we do not understand nilpotent groups of bounded exponent. It seems that the classification of nilpotent (but nonabelian) p-groups of finite Morley rank is impossible. Even the nilpotent groups of Morley rank 2 contain insurmountable difficulties [C], [T] . At first glance, this may seem to be an obstacle to proving the Cherlin-Zil'ber conjecture (“simple groups of finite Morley rank are algebraic groups”). Our purpose in this article is to show that if such a group is a definable subgroup of a nonnilpotent group, then it is possible to obtain a classification within the boundaries of our present knowledge. In this respect, our article may be considered as a relief to those who are trying to classify simple groups of finite Morley rank.

Before explicitly stating our result, we need the following definition.

Type
Research Article
Copyright
Copyright © Association for Symbolic Logic 1993

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References

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