BibTex Citation Data :
@article{JM13931, author = {Kristi Utomo Kristi Utomo}, title = {SUBGRUP -NORMAL DAN SUBRING -MAX}, journal = {Jurnal Matematika}, volume = {5}, number = {2}, year = {2016}, keywords = {Keywords: maximal normal subgroup, -normal subgroup, maximal ideal, -max subring.}, abstract = { ABSTRACT. For any group , subgroup of is called -normal subgroup if there exist a normal subgroup of such that and where is maximal normal subgroup of which is contained in . On the other side, for each ring , subring of is called -max subring if there exist an ideal of such that and where is maximal ideal of which is contained in . Subgroup normal of is -normal subgroup if and only if is maximal normal subgroup and ideal of is -max subring if and only if is maximal ideal. Every group and ring is -normal subgroup and -max subring of itself. }, url = {https://ejournal3.undip.ac.id/index.php/matematika/article/view/13931} }
Refworks Citation Data :
ABSTRACT. For any group , subgroup of is called -normal subgroup if there exist a normal subgroup of such that and where is maximal normal subgroup of which is contained in . On the other side, for each ring , subring of is called -max subring if there exist an ideal of such that and where is maximal ideal of which is contained in . Subgroup normal of is -normal subgroup if and only if is maximal normal subgroup and ideal of is -max subring if and only if is maximal ideal. Every group and ring is -normal subgroup and -max subring of itself.
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