Almost simple groups with socle Ln(q) acting on Steiner quadruple systems
Abstract
Let N=Ln(q), n ≥ 2, q a prime power, be a projective linear simple group. We classify all Steiner quadruple systems admitting a group G with N ≤ G ≤ (N). In particular, we show that G cannot act as a group of automorphisms on any Steiner quadruple system for n>2.
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