ON JORDAN IDEAL IN PRIME AND SEMIPRIME INVERSE SEMIRINGS WITH CENTRALIZER
DOI:
https://doi.org/10.23851/mjs.v30i4.710Keywords:
Additively inverse semiring, Jordan ideal of an inverse semiring, Semiprime inverse semirings .Abstract
In this paper we recall the definition of centralizer on inverse semiring. Also introduce the definition of Jordan ideal and Lie ideal. Some results of M.A.Joso Vukman on centralizers on semiprime rings are generalized here to inverse semirings.
Downloads
References
Golan, J. S., The Theory of Semirings With Applications in Mathematics and Theoretical Computer Science, Longman Scientific and Technical, UK, 1992.
Joso Vukman, Centralizers on semiprime rings, Comment. Math Univ. Carolinae 42,V.2, 237-245. 2001.
Joso Vukman, An identity related to centralizers in semiprime rings, Comment. Math Univ. Carolinae 406, V.3, 447-456. 1999.
Joso Vukman, Centralizers on prime and semiprime rings, Comment. Math. Univ. Carolinae 38,V.2, 231-240. 1997. [CrossRef]
Karvellas, P.H. Inversive semirings, J.Austral Math Soc. 18: 277-288. 1974. [CrossRef]
Ram Awtar, Jordan structure in semiprime rings, Can.j.math, 3, VxxvIII, No.5,1067-1072. 1976. [CrossRef]
Rawnaq, KH. And Abdulrahman H. Majeed, On Lie Structure in Semiprime Inverse Semirings, IRAQ JOURNAL OF SCIENCE, to appear in issue (12), Volume (60) 2019.
Shafiq S. and Aslam, M. and JAVED, M.A. Centralizer of Inverse Semiring, General Algebra and Applications 3671-84(2016).
Shafiq, S. and Aslam, M., On Jordan mapping of inverse semirings, De Gruyter, Open Math. 15: 1123-1131, 2017. [CrossRef]
Shaker. H.A, Centralizers on prime and semiprimerings, Baghdad University (Iraq). Msc. Thesis, 2005.
Downloads
Key Dates
Published
Issue
Section
License
(Starting May 5, 2024) Authors retain copyright and grant the journal right of first publication with the work simultaneously licensed under a Creative Commons Attribution (CC-BY) 4.0 License that allows others to share the work with an acknowledgement of the work’s authorship and initial publication in this journal.