Authors: Mumtaz Ali, Florentin Smarandache, Munazza Naz, Muhammad Shabir
In this article we give an extension of group action theory to neutrosophic theory and develop G-neutrosophic spaces by certain valuable techniques. Every G-neutrosophic space always contains a G-space. A G-neutrosophic space has neutrosophic orbits as well as strong neutrosophic orbits. Then we give an important theorem for orbits which tells us that how many orbits of a G-neutrosophic space. We also introduce new notions called pseudo neutrosophic space and ideal space and then give the important result that the transitive property implies to ideal property.
Comments: 11 Pages.
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[v1] 2014-11-19 04:31:54
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