2-designs admitting a flag-transitive automorphism group with socle PSL(2,q)
Abstract
2-designs admitting a flag-transitive automorphism group G with socle PSL(2,q), where q=pf≥ 4, are investigated in both the point-primitive and point-imprimitive cases. In the latter case, a complete classification is achieved, and three known examples occur, namely: the complementary designs of PG(3,2) and PG(3,4), and the 2-(36,8,4) design constructed by Devillers and Praeger in [14]. In the point-primitive case, apart from the Witt-Bose-Shrikhande linear spaces of even order q, 48 sporadic examples are classified. Surprisingly, one of these numerical examples is the linear space with v=496 and k=4 admitting PΓL(2,25) as a flag-transitive automorphism group, which was missing in the 1990 classification by Buekenhout et al. [7,36,12].
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