BA-Semigroup
Article Sidebar
Main Article Content
Abstract
Several algebraic structures have been studied by many authors to discuss the relationships among them. This article aims to study two algebraic structures, namely semigroup and BA-algebra, by combining them in one form, namely BA-semigroup and investigate some of its properties. This paper studied the BA-sub-semigroup, an ideal and BA-homomorphism of a BA-semigroup with some of their properties. Some examples are given to illustrate the results.
Article Details
This work is licensed under a Creative Commons Attribution 4.0 International License.
Tikrit Journal of Pure Science is licensed under the Creative Commons Attribution 4.0 International License, which allows users to copy, create extracts, abstracts, and new works from the article, alter and revise the article, and make commercial use of the article (including reuse and/or resale of the article by commercial entities), provided the user gives appropriate credit (with a link to the formal publication through the relevant DOI), provides a link to the license, indicates if changes were made, and the licensor is not represented as endorsing the use made of the work. The authors hold the copyright for their published work on the Tikrit J. Pure Sci. website, while Tikrit J. Pure Sci. is responsible for appreciate citation of their work, which is released under CC-BY-4.0, enabling the unrestricted use, distribution, and reproduction of an article in any medium, provided that the original work is properly cited.
References
[1] N. Jackson, A Course in Abstract Algebra, 2017, pp.3.
[2] A. H. Nouri. " BA-algebra". International Journal of Algebra, vol. 13, no.7, pp. 323-330, 2019.
[3] A. H. Nouri and L. S. Mahdi. "BS-algebra and Pseudo Z-algebra". 2nd International Conference on Physics and Applied Sciences (ICPAS), pp. 1- 6, 2021.
[4] J. Neggers and H. S. Kim. "On B-algebras". Matematiqki Vesnik, vol.54, pp. 21-29, 2002.
[5] C. B. Kim and H. S. Kim. "On BG-algebras". Demonsteatio Mathematica, vol. 41, no. 3, pp. 497-505, 2008.
[6] C. B. Kim and H. S. Kim. "On BO-algebras". Mthematica Slovaca, vol 62, no. 5, pp.855-864, 2012.
[7] C. B. Kim and H. S. Kim. "On BM-algebras". Scientiae Mathematicae Japonicae, vol.63, pp. 215-221, 2006.
[8] J. Angeline, V. Lingcong and J. C. Endam. "Direct Product of B-algebras". International Journal of Algebra, vol. 10, no. 1, pp. 33-40, 2016.
[9] R. C. Teves and J. C. Endam. "Direct Product of BF-Algebras". International Journal of Algebra, vol. 10, no. 3, pp. 125-132, 2016.
[10] S. Widianto, S. Gemawati, and Kartini. "Direct Product in BG-Algebras". International Journal of Algebra, vol. 13, no. 5, pp. 239-247, 2019.
[11] J. S. Bantug and J. C. Endam. "Lagrange’s Theorem for B-algebras". International Journal of Algebra, vol. 11, no. 1, pp. 15-23, 2017.
[12] J. Angeline, V. Lingcong and J. C. Endam. "Mappings of the Direct Product of B-algebras". International Journal of Algebra, vol. 10, no. 3, pp. 133-140, 2016.
[13] S. S. Ahn and Y. H. Kim. "On BE-Semigroups". International Journal of Mathematics and Mathematical Sciences, vol. 2011, pp.1-8, 2011.
[14] Y. Çeven. "On B-Semigroups". Journal of Science, vol.30, no. 4, pp.404-411, 2017.