Noether's problem for some subgroups of S14: the modular case

Abstract

Let G be a subgroup of Sn, the symmetric group of degree n. For any field k, G acts naturally on the rational function field k(x1,·s,xn) via k-automorphisms defined by σ· xi:=xσ· i for any σ∈ G and 1≤ i≤ n. In this article, we will show that if G is a solvable transitive subgroup of S14 and char(k)=7, then the fixed subfield k(x1,·s,x14)G is rational (i.e., purely transcendental) over k. In proving the above theorem, we rely on the Kuniyoshi-Gasch\"utz Theorem or some ideas in its proof.