Block-transitive 3-(v,k,1) designs associated with alternating groups
Abstract
Let D be a nontrivial 3-(v,k,1) design admitting a block-transitive group G of automorphisms. A recent work of Gan and the second author asserts that G is either affine or almost simple. In this paper, it is proved that if G is almost simple with socle an alternating group, then D is the unique 3-(10,4,1) design, and G=PGL(2,9), M10 or Aut(A6 )=S6:Z2, and G is flag-transitive.
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