The rank 3 geometries of the simple Suzuki groups $Sz(q)$
DOI:
https://doi.org/10.1285/i15900932v19n1p43Abstract
We determine all possible rank three geometries on which a Suzuki simple group $Sz(q)$, with q an odd power of two, acts residually weakly primitively Rwpri. We observe that if we impose the $(2T)_{1}$ property, them is no Rwpri geometry of rank $ ≥ 4$ on which $Sz(q)$ acts.Downloads
Published
01-01-1999
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