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Neutrosophic Triplet Group
Neutrosophic Triplet Group
Tèmítópé Gbóláhàn Jaíyéolá We already know that a Commutative Generalized Group is a Classical Group. Am like to know if the same is true or not for Neutrosophic Triplet Group. Looking through your paper 'Neutrosophic triplet group',
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I observed that you proved some results (Theorems 3.13-3.15) on commutative Neutrosophic Triplet
Group. But none talks about whether or not commutative Neutrosophic Triplet Group is a
Classical Group or not. From the examples you gave in that same paper, I want to be sure that we have a commutative Neutrosophic triplet group that is not a classical group. Example 3.2 with table 1 seems to be such! Correct? Florentin Smarandache Interesting to hear about the commutative general group to be a commutative classical group. Can you please send me a such paper proving it? But, the commutative neutrosophic triplet group in general is not a (commutative) classical group. In Example 3.2, the set (Z10, #), with a#b = 3ab is not a classical group, since not all elements are inversable. The classical unitary element is 7 since a#7 = 7#a = 3a7 = 21a = a (mod 10). But, for example, element 2 is not inversable since:
