Fixed point subgroups of a supertight automorphism

Abstract

Let G be an infinite simple group of finite Morley rank and α a supertight automorphism of G so that the fixed point subgroup Pn:=CG(αn) is pseudofinite for all n∈ N\0\. It is know (using CFSG) that the socle Sn:= Soc(Pn) is a (twisted) Chevalley group over a pseudofinite field. We prove that there is r∈ N\0\ so that for each n we have [Pn:Sn] < r and that there is no m ∈ N \0\ so that for each n the sizes of the Sylow 2-subgroups of Sn are bounded by m. We also note that in the recent identification result of G under the assumption pr2(G)=1, the use of CFSG is not needed.