On biprimitive semisymmetric graphs

Abstract

A regular bipartite graph is called semisymmetric if its full automorphism group Aut() acts transitively on the edge set but not on the vertex set. For a subgroup G of Aut() that stabilizes the biparts of , we say that is G-biprimitive if G acts primitively on each part. In this paper, we first provide a method to construct infinite families of biprimitive semisymmetric graphs admitting almost simple groups. With the aid of this result, a classification of G-biprimitive semisymmetric graphs is obtained for G=An or Sn. In pursuit of this goal, we determine all pairs of maximal subgroups of An or Sn with the same order and all pairs of almost simple groups of the same order.

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