BibTex Citation Data :
@article{JM7083, author = {Irwan Yudi}, title = {KETERKAITAN RG-ALJABAR DAN STRUKTUR GRUP}, journal = {Jurnal Matematika}, volume = {3}, number = {4}, year = {2014}, keywords = {}, abstract = { In this paper is discussed an algebraic structure which is called RG -algebra. The RG- algebra is a subclass of BCI -algebra and a sub subclass of K- algebra. Therefore, every RG -algebra is a BCI -algebra, but conversly is not true. The RG -algebra andGroup Structure have a relation. Its relation is RG- algebra can be constructed by acommutativegroup and conversly commutativegroup can be constructed by a RG- algebra. The RG -algebra is a K -algebra with commutativegroupas generator group. }, url = {https://ejournal3.undip.ac.id/index.php/matematika/article/view/7083} }
Refworks Citation Data :
In this paper is discussed an algebraic structure which is called RG-algebra. The RG-algebra is a subclass of BCI-algebra and a sub subclass of K-algebra. Therefore, everyRG-algebra is a BCI-algebra, but conversly is not true. The RG-algebra andGroup Structure have a relation. Its relation is RG-algebra can be constructed by acommutativegroup and conversly commutativegroup can be constructed by a RG-algebra. The RG-algebra is a K-algebra with commutativegroupas generator group.
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