Author:
Wu Xiaoying,Zhang Xiaohong
Abstract
In this paper, some new properties of Abel Grassmann‘s Neutrosophic Extended Triplet Loop (AG-NET-Loop) were further studied. The following important results were proved: (1) an AG-NET-Loop is weakly commutative if, and only if, it is a commutative neutrosophic extended triplet (NETG); (2) every AG-NET-Loop is the disjoint union of its maximal subgroups. At the same time, the new notion of Abel Grassmann’s (l, l)-Loop (AG-(l, l)-Loop), which is the Abel-Grassmann’s groupoid with the local left identity and local left inverse, were introduced. The strong AG-(l, l)-Loops were systematically analyzed, and the following decomposition theorem was proved: every strong AG-(l, l)-Loop is the disjoint union of its maximal sub-AG-groups.
Subject
General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)
Reference38 articles.
1. A study of some properties of generlized groups;Akinmoyewa;Octogon,2009
2. On injective and subdirectly irreducible S-acts over left zero semigroups;Turk;Tubitak,2012
3. Characterization of digraphs of right (left) zero unions of groups;Arworn;Thai J. Math.,2003
4. On finitely generated idempotent semigroups
5. Note on idempotent semigroups, II
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