Note on the candidate counter-example in the cancellation problem for affine spaces posed by Arno Van den Essen

Abstract

We have proved the following Problem: Let R be a C-affine domain, let T be an element in R C and let i : C[T] R be the inclusion. Assume that R/TR C C[n-1] and that RT C[T] C[T]T[n-1]. Then R C C[n]. This result leads to the negative solution of the candidate counter-example of V.Arno den Lessen : Conjecture E : Let A:=C[t,u,x,y,z] denote a polynomial ring, and let f(u):=u3-3u, g(u):=u4-4u2 and h(u):=u5-10u be the polynomials in C[u]. Let D:= f'(u)∂x + g'(u)∂y + h'(u)∂z + t∂u\ (which is easily seen to be a locally nilpotent derivation on A). Then AD C C[4]. Consequently our result in this short paper guarantees that the conjectures : "the Cancellation Problem for affine spaces", "the Linearization Problem", "the Embedding Problem" and "the affine An-Fibration Problem" are still open.