Rings with trivial FML-invariant

Abstract

Let k be a field of characteristic zero and B a commutative integral domain that is also a finitely generated k-algebra. It is well known that if k is algebraically closed and the "Field Makar-Limanov" invariant FML(B) is equal to k, then B is unirational over k. This article shows that, when k is not assumed to be algebraically closed, the condition FML(B)=k implies that there exists a nonempty Zariski-open subset U of Spec(B) with the following property: for each prime ideal p ∈ U, the (p)-algebra (p) k B can be embedded in a polynomial ring in n variables over (p), where n= B and (p) = Bp/pBp.