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Neutrosophic Ideals
Also, neutrosophic interval vector transformed into vector neutrosophic interval. I think neutrosophic derivation and integration would be very innovatory in science. The problem would be how to differentiate and integrate
I (indeterminate)? What justification to give to the result?
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Neutrosophic Ideals
To W. B. Vasantha Kandasamy In algebraic structures an IDEAL is a subring of a ring such that it is closed under difference and under multiplication for any two elements from the ring. Therefore the ideal is in the first hand a SET. Therefore a neutrosophic ideal in our books is a set of the form a+bI, where I=indeterminacy. While professor Ahmed Salama from Egypt presents the neutrosophic ideal as a FAMILY of neutrosophic sets (not as a single set), family closed under union of its elements, and hereditary (if the family contains A that contains B, then the family also contains B). We can say the family is closed under containment. Salama uses more topology in my opinion. He is right in his work, but I hope there would be no confusion between the two different notions, named the same: neutrosophic ideal.
