The average of the smallest prime in a conjugacy class
Abstract
Let C be a conjugacy class of Sn and K an Sn-field. Let nK,C be the smallest prime which is ramified or whose Frobenius automorphism Frobp does not belong to C. Under some technical conjectures, we compute the average of nK,C. For S3 and S4-fields, our result is unconditional. For Sn-fields, n=3,4,5, we give a different proof which depends on the strong Artin conjecture. Let NK,C be the smallest prime for which Frobp belongs to C. For S3-fields, we obtain an unconditional result for the average of NK,C for C=[(12)].
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