2014
DOI: 10.1016/j.jalgebra.2014.01.001
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Moufang sets of finite Morley rank of odd type

Abstract: We show that for a wide class of groups of finite Morley rank the presence of a split $BN$-pair of Tits rank $1$ forces the group to be of the form $\operatorname{PSL}_2$ and the $BN$-pair to be standard. Our approach is via the theory of Moufang sets. Specifically, we investigate infinite and so-called hereditarily proper Moufang sets of finite Morley rank in the case where the little projective group has no infinite elementary abelian $2$-subgroups and show that all such Moufang sets are standard (and thus a… Show more

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“…(see[Wis14, Theorem A]). Let (X, {U x : x ∈ X}) be a Moufang set of finite Morley rank with abelian Hua subgroups and infinite root groups that contain no involutions.…”
mentioning
confidence: 99%
“…(see[Wis14, Theorem A]). Let (X, {U x : x ∈ X}) be a Moufang set of finite Morley rank with abelian Hua subgroups and infinite root groups that contain no involutions.…”
mentioning
confidence: 99%