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Title
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The Rank 3 Geometries of the Simple Suzuki Group Sz(q)
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Author
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Dimitri Leemans
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Reference
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Note Mat. 19 (1999), no. 1, 43-63.
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Math. Reviews
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2001m:51019
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Zentralblatt
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not available yet
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Abstract
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We determine all rank 3 geometries on which a Suzuki simple group $Sz(q)$, with $q$ an odd power of two, acts
residually weakly primitively ({\sc Rwpri}).
We observe that if we impose the $(2T)_1$ property, there is no {\sc Rwpri} geometry of rank $\geq 4$ on which $Sz(q)$ acts.
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