A Jordan decomposition for groups of finite Morley rank

Details A Jordan decomposition for groups of finite Morley rank A Jordan decomposition for groups of finite Morley rank

2010-09-16

arxiv.org/abs/1009.3160v1

Mathematics

Logic

Scientific paper

We prove a Jordan decomposition theorem for minimal connected simple groups of finite Morley rank with non-trivial Weyl group. From this, we deduce a precise structural description of Borel subgroups of this family of simple groups. Along the way we prove a Tetrachotomy theorem that classifies minimal connected simple groups. Some of the techniques that we develop help us obtain a simpler proof of a theorem of Burdges, Cherlin and Jaligot.

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