Draft:Unbounded generating number
Submission declined on 29 December 2023 by MicrobiologyMarcus (talk).
Where to get help
How to improve a draft
You can also browse Wikipedia:Featured articles and Wikipedia:Good articles to find examples of Wikipedia's best writing on topics similar to your proposed article. Improving your odds of a speedy review To improve your odds of a faster review, tag your draft with relevant WikiProject tags using the button below. This will let reviewers know a new draft has been submitted in their area of interest. For instance, if you wrote about a female astronomer, you would want to add the Biography, Astronomy, and Women scientists tags. Editor resources
|
- Comment: cite to secondary sources to demonstrate WP:Notability microbiologyMarcus (petri dish·growths) 20:33, 29 December 2023 (UTC)
In mathematics, more specifically in the field of ring theory, a ring R has unbounded generating number (UGN) if, for each positive integer m, any set of generators for the free right R-module Rm has cardinality ≥m.[1]
Rings with unbounded generating number have in the literature also been referred to as satisfying the rank condition.[2]
The definition is left–right symmetric, so it makes no difference whether we define UGN in terms of left or right modules; the two definitions are equivalent.[3]
References
[edit]Sources
[edit]- Abrams, Gene; Nam, Tran Giang; Phuc, Ngo Tan (2017), "Leavitt path algebras having unbounded generating number", J. Pure Appl. Algebra, 221 (6): 1322–1343, arXiv:1603.09695, doi:10.1016/j.jpaa.2016.09.014, ISSN 1873-1376, MR 3599434
- Lam, Tsit Yuen (1999), Lectures on modules and rings, Graduate Texts in Mathematics, vol. 189, New York: Springer-Verlag, pp. xxiv+557, ISBN 0-387-98428-3, MR 1653294
- in-depth (not just passing mentions about the subject)
- reliable
- secondary
- independent of the subject
Make sure you add references that meet these criteria before resubmitting. Learn about mistakes to avoid when addressing this issue. If no additional references exist, the subject is not suitable for Wikipedia.