Neutrosophic Triplet Group and Related Algebraic Aspects

Abstract

Neutrosophic triplet groups is new algebraic structure which is each element has a neutral element denoted by neut so that satisfy a neut a neut a a a         dan opposite element denoted by anti so that satisfy a anti a anti a a neut a           equipped with a binary operation that satisfy two axioms is group is closed and its binary operation are associative. Neutrosophic triplet group has the same aspects as the group such as neutrosophic triplet subgroup, neutro-cyclic group and neutro-homomorphism group. Associative, commutative and cancellation law also apply on Neutrosophic Triplet Group. Keyword : Group, Neutrosophic Triplet Group, Neutrosophic Triplet Group Aspects.