Hilbert's fourteenth problem and field modifications

Abstract

Let k( x)=k(x1,… ,xn) be the rational function field, and k⊂neqq L⊂neqq k( x) an intermediate field. Then, Hilbert's fourteenth problem asks whether the k-algebra A:=L k[x1,… ,xn] is finitely generated. Various counterexamples to this problem were already given, but the case [k( x):L]=2 was open when n=3. In this paper, we study the problem in terms of the field-theoretic properties of L. We say that L is minimal if the transcendence degree r of L over k is equal to that of A. We show that, if r 2 and L is minimal, then there exists σ ∈ Autkk(x1,… ,xn+1) for which σ (L(xn+1)) is minimal and a counterexample to the problem. Our result implies the existence of interesting new counterexamples including one with n=3 and [k( x):L]=2.