BibTex Citation Data :
@article{JM13927, author = {Irtrianta Pasangka Irtrianta Pasangka}, title = {URUTAN PARSIAL PADA SEMIGRUP DAN PADA KELAS-KELAS DARI SUATU SEMIGRUP}, journal = {Jurnal Matematika}, volume = {5}, number = {2}, year = {2016}, keywords = {Semigroup, partial order.}, abstract = { ABSTRACK. Non empty set with binary operation is called semigroup if the binary operation on is associative. An element a of semigroup is called regular if there exist such that and semigroup is called invers if there exist such that dan . Partial order is relation which is satisfy reflexive, antysymetric and transitive. Relation dan is equivalent relation. Let be semigroup and relation for every , is class that contain . Thus obtain on relations dan . Relation is called partially order relation of regular semigroup if for any , if and only if and for some . Relation is called partially order relation of regular semigroup if for any , if and only if for some . }, url = {https://ejournal3.undip.ac.id/index.php/matematika/article/view/13927} }
Refworks Citation Data :
ABSTRACK. Non empty set with binary operation is called semigroup if the binary operation on is associative. An element a of semigroup is called regular if there exist such that and semigroup is called invers if there exist such that dan . Partial order is relation which is satisfy reflexive, antysymetric and transitive. Relation dan is equivalent relation. Let be semigroup and relation for every , is class that contain . Thus obtain on relations dan . Relation is called partially order relation of regular semigroup if for any , if and only if and for some . Relation is called partially order relation of regular semigroup if for any , if and only if for some .
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