On a class of transitive permutation groups of prime degreep=4n+1

SupposeG is a nonsolvable transitive permutation group of prime degreep, such that |N _G v(P)|=p(p−1) for some Sylowp-subgroupP ofG. Letq be a generator of the subgroup ofN _G (P), fixing one letter (it is easy to show that this subgroup is cyclic). Assume thatG contains an elementj such thatj ⁻¹ qj=q ^(p+1)/2. We shall prove that for almost all primesp of the formp=4n+1, a group that satisfies the above conditions must be the symmetric group on a set withp elements.