On nice Gm-actions arising from locally nilpotent derivations with slice

Abstract

Let k be an algebraically closed field of characteristic zero and B a finitely generated k-domain. Given a locally nilpotent derivation D on B admitting a slice s, the derivation ∂=NsD (N∈Z\0\) is semisimple and defines a regular Gm-action on Spec(B). We show that this derivation provides a new explicit description of the Gm-action introduced by Freudenburg in terms of the infinitesimal generator ∂=NsD. In the nice case (D2(xi)=0 for all generators), we prove a linearizability criterion: the associated Gm-action is linearizable if and only if D is automorphically conjugate to ∂/∂ xn and the slice becomes affine-linear in the distinguished variable; moreover, this criterion is independent of the choice of slice.