The (Zn, +) Group That Build K(Zn)-Algebras
Keywords:
Group, homomorphism, K-algebra, K-homomorphismAbstract
The concept which is applied in the K-algebra is similar to the concept of group. If in group there is a group homomorphism,then in K-algebra there is K-homomorphism. This study discusses the structure and properties associated with the K- algebra and K-homomorphism and also discuss about a grub which can build K-algebra that is (Z_n,+_n) group. This research used literature review, by collecting a variety of sources and theorems that support the research.
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References
Dar, K. H., and M. Akram. 2007. “On K-Homomorphisms of K-Algebras.” International Mathematical Forum 2(46): 2283–93.
Dar, K. H, and M. Akram. 2014. “On Subclasses of K (G) -Algebras.” Annals of the University of Craiova-Mathematics and Computer Science Series 33: 235–40. http://inf.ucv.ro/~ami/index.php/ami/article/view/218/214.
Iswati, and Suryoto. “K-Aljabar.”: 1–9.
Neggers, J, and Hee Sik Kim. 2002. “On B-Algebras.” 54: 21–29.
Wicaksono, Pramitha Shafika, Y D Sumanto, and Bambang Irawanto. 2021. “B-Algebras Which Generated by Z n Group.” 9(3): 151–60
