On the geometry of subgroups of Suzuki group in finite non-miquelian inversive planes
Abstract
The simple Suzuki group $Sz(2^{2r+1})$ can be considered as a subgroup of the group of collineations of 3-dimensional projective space $PG(3,2^{2r+1})$ over $GF(2^{2r+1})$, fixing the special Tits ovoid $t(\psi)$. This group determines a finite non-miquelian egglike Mobius plane $J(o)$ of order $q$, consisting of points and plane sections f the above ovoid, when $q=2^{2r+1}$. In this paper a detailed picture of geometry of the subgroups of $Sz(2^{2r+1})$ is given with respect to the non-miquelian Mobius plane $S(q)$
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Published
1993-12-12
How to Cite
Lozanov, C., & Eneva, G. (1993). On the geometry of subgroups of Suzuki group in finite non-miquelian inversive planes. Ann. Sofia Univ. Fac. Math. And Inf., 85, 49–54. Retrieved from https://ftl5.uni-sofia.bg./index.php/fmi/article/view/453
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