Essential dimension of symmetric groups in prime characteristic

Abstract

The essential dimension edk( Sn) of the symmetric group Sn is the minimal integer d such that the general polynomial xn + a1 xn-1 + … + an can be reduced to a d-parameter form by a Tschirnhaus transformation. Finding this number is a long-standing open problem, originating in the work of Felix Klein, long before essential dimension was formally defined. We now know that edk( Sn) lies between n/2 and n-3 for every n ≥slant 5 and every field k of characteristic different from 2. Moreover, if char(k) = 0, then edk( Sn) ≥slant (n+1)/2 for any n ≥slant 6. The value of edk( Sn) is not known for any n ≥slant 8 and any field k, though it is widely believed that edk( Sn) should be n-3 for every n ≥slant 5, at least in characteristic 0. In this paper we show that for every odd prime p there are infinitely many positive integers n such that ed Fp(Sn) ≤slant n-4.