On a Problem of Chevalley

Abstract

Recently Prof. Chevalley in Nagoya suggested to the author the following problem: Let k be a field, K₅ = k(x₁, x₂, x₃, x₄, x₅) be a purely transcendental extension field (of transcendental degree 5) of k, s₅ be the cyclic permutation of x: S₅X₁ = x₂s₅x₂ = x₃s₅x₃ = x₄s₅x₄ = x₅s₅x₅ = x₁, and let L₅ be the field of invariants of s₅ in K₅. Is L₅ then purely transcendental over k or not? When the characteristic p of k is not equal to 5, it is answered in the following positively. When the characteristic p of k is equal to 5, it is answered also positively by Mr. Kuniyoshi’s result in [2].