Upper bound on the number of ramified primes for odd order solvable groups

Abstract

Let G be a finite group and let ramt(G) denote the minimal positive integer n such that G can be realized as the Galois group of a tamely ramified extension of Q ramified only at n finite primes. Let d(G) denote the minimal non negative integer for which there exists a subset X of G with d(G) elements such that the normal subgroup of G generated by X is all of G. It is known that d(G)≤ ramt(G). However, it is unknown whether or not every finite group G can be realized as a Galois group of a tamely ramified extension of Q with exactly d(G) ramified primes. We will show that 3· log(|G|) is an upper bound for ramt(G) for all odd order solvable group G.