Noether's problem for cyclic groups of prime order

Let k be a field and be the rational function field of p variables over k where p is a prime number. Suppose that acts on by k-automorphisms defined as . Denote by P the set of all prime numbers and define is of class number one where a primitive n-th root of unity in for a positive integer n; is a finite set by Masley and Montgomery (J Reine Angew Math 286/287:248-256, 1976). Theorem. Let k be an algebraic number field and is ramified in . Then is not stably rational over k for all p is an element of P\(P-0 boolean OR P-k).