On the Isotropy Groups of Non-Invertible Simple Derivations

Abstract

Let k be a field of characteristic zero, and let i and n be positive integers with i≥ 2 and n>i. Consider a non-invertible k-derivation di of the polynomial ring k[x1,…,xi]. Let dn be an extension of di to a derivation of k[x1,…, xn] such that dn(xj)∈ k[xj-1] k for each j with i+1 ≤ j≤ n. In this article, we undertake a systematic study of the isotropy groups associated with such non-invertible derivations. We establish sufficient conditions on di under which the isotropy group of the non-invertible simple derivation dn is conjugate to a subgroup of translations.