Simplicity and Commutative Bases of Derivations in Polynomial and Power Series Rings
Abstract
The first part of the paper will describe a recent result of K. Retert in (Ret) for k[x1,…,xn] and k[[x1,…,xn]]. This result states that if D is a set of commute k-derivations of k[x,y] such that both ∂x ∈ D and the ring is D-simple, then there is d ∈ D such that k[x,y] is \∂x,d\-simple. As applications, we obtain relationships with known results of A. Nowicki on commutative bases of derivations.
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