BibTex Citation Data :
@article{JM12253, author = {Restia Citra and Suryoto .}, title = {ENDOMORFISMA L0 DARI BCH-ALJABAR}, journal = {MATEMATIKA}, volume = {16}, number = {1}, year = {2016}, keywords = {}, abstract = { BCH -algebras is an algebraic structure which built on a commutative group. In BCH -algebra there is a mapping from this structure to itself which called a BCH -endomorphism. In BCH -algebra context, we denote L as a set of all left mapping and it contains L 0 which the only non-identity BCH -endomorphism in L with some properties : the left map L 0 is a center of BCH -endomorphism, L 0 both be a periodic mapping dan an epimorphism on BCH -algebra. Such as a group with the fundamental group homomorphism theorem, in a BCH -algebra we have a fundamental BCH -algebra homomorphism theorem. }, url = {https://ejournal.undip.ac.id/index.php/matematika/article/view/12253} }
Refworks Citation Data :
BCH-algebras is an algebraic structure which built on a commutative group. In BCH-algebra there is a mapping from this structure to itself which called a BCH-endomorphism. In BCH-algebra context, we denote L as a set of all left mapping and it contains L0 which the only non-identity BCH-endomorphism in L with some properties : the left map L0 is a center of BCH-endomorphism, L0 both be a periodic mapping dan an epimorphism on BCH-algebra. Such as a group with the fundamental group homomorphism theorem, in a BCH-algebra we have a fundamental BCH-algebra homomorphism theorem.
Last update:
Last update: 2024-11-22 12:56:00