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Numerical & Literal Indeterminacies
Scilogs, V: joining the dots
For example, a part-time faculty only partially belong to the university he works for. And so on. Therefore, one can define algebraic structures on a set whose elements do not completely belong to the set (or at list some of its elements do not completely belong to the set). We call them (t,i,f)-elements (t = membership degree, i = indeterminacy degree, and f = nonmembership degree). And the structures on these sets are called (t,i,f)-structures. I gave some small examples in the book Symbolic
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Neutrosophic Theory (2015), Ch. 4, [http://fs.unm.edu/SymbolicNeutrosophicTheory.pdf] of such structures.
Numerical & Literal Indeterminacies
To Madad Khan There are two types of indeterminacies: numerical, and literal. For "I" = numerical indeterminacy, i.e. it is a numerical interval, or a numerical set. For "I" = literal indeterminacy, Dr. Vasantha and me considered that: indeterminacy × indeterminacy = indeterminacy. That’s why we have chosen I2 = I. Similarly for the truth, T2 = T, since: truth × truth = truth.
