Flag-transitive point-primitive quasi-symmetric 2-designs with block intersection numbers 0 and y≤10
Abstract
In this paper, we show that for a non-trivial quasi-symmetric 2-design D with two block intersection numbers x=0 and 2≤ y≤10, if G≤ Aut(D) is flag-transitive and point-primitive, then G is either of affine type or almost simple type. Moreover, we prove that the socle of G cannot be an alternating group. If the socle of G is a sporadic group, then D and G must be one of the following: D is a 2-(12,6,5) design with block intersection numbers 0,3 and G=M11, or D is a 2-(22,6,5) design with block intersection numbers 0,2 and G=M22 or M22:2.
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