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Bad groups of finite Morley rank
Journal of Symbolic Logic 54 (3):768-773 (1989)
Abstract
We prove the following theorem. Let G be a connected simple bad group (i.e. of finite Morley rank, nonsolvable and with all the Borel subgroups nilpotent) of minimal Morley rank. Then the Borel subgroups of G are conjugate to each other, and if B is a Borel subgroup of G, then $G = \bigcup_{g \in G}B^g,N_G(B) = B$ , and G has no involutionsLinks
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Citations of this work
Full frobenius groups of finite Morley rank and the Feit-Thompson theorem.Eric Jaligot - 2001 - Bulletin of Symbolic Logic 7 (3):315-328.
On the structure of stable groups.Frank O. Wagner - 1997 - Annals of Pure and Applied Logic 89 (1):85-92.
Full Frobenius Groups Of Finite Morley Rank And The Feit-thompson Theorem, By, Pages 315 -- 328.Eric Jaligot - 2001 - Bulletin of Symbolic Logic 7 (3):315-328.
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