The endomorphism rings of permutation modules of 32-transitive permutation groups
Abstract
Recent classification of 32-transitive permutation groups leaves us with six families of groups which are 2-transitive, or Frobenius, or one-dimensional affine, or the affine solvable subgroups of AGL(2, q), or special projective linear group PSL(2, q), or P L(2, q), where q=2p with p prime. According to a case by case analysis, we prove that the endomorphism ring of the natural permutation module for a 32-transitive permutation group is a symmetric algebra.
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