Abstract
Abstract. In this paper, we make a short history about: the neutrosophic set, neutrosophic numerical components and neutrosophic literal components, neutrosophic numbers, neutrosophic intervals, neutrosophic hypercomplex numbers of dimension n, and elementary neutrosophic algebraic structures. Afterwards, their generalizations to refined neutrosophic set, respectively refined neutrosophic numerical and literal components, then refined neutrosophic numbers and refined neutrosophic algebraic structures. The aim of this paper is to construct examples of splitting the literal indeterminacy ሺࡵሻ into literal sub-indeterminacies ሺࡵ ,ࡵ,...,࢘ࡵሻ, and to define a multiplication law of these literal sub-indeterminacies in order to be able to build refined ࡵ െ neutrosophic algebraic structures. Also, examples of splitting the numerical indeterminacy ሺሻ into numerical sub-indeterminacies, and examples of splitting neutrosophic numerical components into neutrosophic numerical sub-components are given.
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