Buckley, Stephen M. and MacHale, Desmond
(2013)
Polynomials That Force a Unital Ring to be Commutative.
Results in Mathematics, 64 (1-2).
pp. 59-65.
ISSN 1422-6383
Abstract
We characterize polynomials f with integer coefficients such that a ring with unity R is necessarily commutative if f(R) = 0, in the sense that f(x) = 0 for all x∈R . Such a polynomial must be primitive, and for primitive polynomials the condition f(R) = 0 forces R to have nonzero characteristic. The task is then reduced to considering rings of prime power characteristic and the main step towards the full characterization is a characterization of polynomials f such that R is necessarily commutative if f(R) = 0 and R is a unital ring of characteristic some power of a fixed prime p.
| Item Type: |
Article
|
| Keywords: |
16R50; Unital ring; Polynomial identity; Commutativity; Monoid ring; |
| Academic Unit: |
Faculty of Science and Engineering > Mathematics and Statistics |
| Item ID: |
4829 |
| Identification Number: |
https://doi.org/10.1007/s00025-012-0296-0 |
| Depositing User: |
Prof. Stephen Buckley
|
| Date Deposited: |
18 Mar 2014 12:15 |
| Journal or Publication Title: |
Results in Mathematics |
| Publisher: |
Springer Verlag (Germany) |
| Refereed: |
Yes |
| URI: |
|
| Use Licence: |
This item is available under a Creative Commons Attribution Non Commercial Share Alike Licence (CC BY-NC-SA). Details of this licence are available
here |
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