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

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. Let p be any prime and let G be a p-group of exponent pe. Assume also that (i) char K = p>0, or (ii) char K p and K contains a primitive pe-th root of unity. In this paper we prove that if G is any p-group of nilpotency class 2, which has the ABC (Abelian-By-Cyclic) property, then K(G) is rational over K. We also prove the rationality of K(G) over K for two 3-generator p-groups G of arbitrary nilpotency class.