We found a match
Your institution may have access to this item. Find your institution then sign in to continue.
- Title
Images of ideals under derivations and ℰ-derivations of univariate polynomial algebras over a field of characteristic zero.
- Authors
Zhao, Wenhua
- Abstract
Let K be a field of characteristic zero and x a free variable. A K - ℰ -derivation of K [ x ] is a K -linear map of the form I , − , ϕ for some K -algebra endomorphism ϕ of K [ x ] , where I denotes the identity map of K [ x ]. In this paper, we study the image of an ideal of K [ x ] under some K -derivations and K - ℰ -derivations of K [ x ]. We show that the LFED conjecture proposed in [W. Zhao, Some open problems on locally finite or locally nilpotent derivations and ℰ -derivations, Commun. Contem. Math. 20(4) (2018) 1750056] holds for all K - ℰ -derivations and all locally finite K -derivations of K [ x ]. We also show that the LNED conjecture proposed in [W. Zhao, Some open problems on locally finite or locally nilpotent derivations and ℰ -derivations, Commun. Contem. Math. 20(4) (2018) 1750056] holds for all locally nilpotent K -derivations of K [ x ] , and also for all locally nilpotent K - ℰ -derivations of K [ x ] and the ideals u K [ x ] such that either u = 0 , or deg u ≤ 1 , or u has at least one repeated root in the algebraic closure of K. As a bi-product, the homogeneous Mathieu subspaces (Mathieu–Zhao spaces) of the univariate polynomial algebra over an arbitrary field have also been classified.
- Subjects
ALGEBRA; POLYNOMIALS; BERNOULLI numbers; BERNOULLI polynomials; ENDOMORPHISMS
- Publication
Journal of Algebra & Its Applications, 2024, Vol 23, Issue 6, p1
- ISSN
0219-4988
- Publication type
Article
- DOI
10.1142/S0219498824501287