Noether's problem for the groups with a cyclic subgroup of index 4

Abstract

Let G be a finite group and k be a field. Let G act on the rational function field k(xg:g∈ G) by k-automorphisms defined by g· xh=xgh for any g,h∈ G. Noether's problem asks whether the fixed field k(G)=k(xg:g∈ G)G is rational (i.e. purely transcendental) over k. Theorem 1. If G is a group of order 2n (n 4) and of exponent 2e such that (i) e n-2 and (ii) ζ2e-1 ∈ k, then k(G) is k-rational. Theorem 2. Let G be a group of order 4n where n is any positive integer (it is unnecessary to assume that n is a power of 2). Assume that (i) chark 2, ζn ∈ k, and (ii) G contains an element of order n. Then k(G) is rational over k, except for the case n=2m and G Cm C8 where m is an odd integer and the center of G is of even order (note that Cm is normal in Cm C8) ; for the exceptional case, k(G) is rational over k if and only if at least one of -1, 2, -2 belongs to (k×)2.