Noether's problem for abelian extensions of cyclic p-groups

Abstract

Let K be a field and G be a finite group. Let G act on the rational function field K(x(g):g∈ G) by K automorphisms defined by g· x(h)=x(gh) for any g,h∈ G. Denote by K(G) the fixed field K(x(g):g∈ G)G. Noether's problem then asks whether K(G) is rational (i.e., purely transcendental) over K. The first main result of this article is that K(G) is rational over K for a certain class of p-groups having an abelian subgoup of index p. The second main result is that K(G) is rational over K for any group of order p5 or p6 (p is an odd prime) having an abelian normal subgroup such that its quotient group is cyclic. (In both theorems we assume that if char K p then K contains a primitive pe-th root of unity, where pe is the exponent of G.)