Separation Axioms on Bipolar Hypersoft Topological Spaces

Separation Axioms on Bipolar Hypersoft Topological Spaces
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Publisher : Infinite Study
Total Pages : 16
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Book Synopsis Separation Axioms on Bipolar Hypersoft Topological Spaces by : Sagvan Y. Musa

Download or read book Separation Axioms on Bipolar Hypersoft Topological Spaces written by Sagvan Y. Musa and published by Infinite Study. This book was released on 2023-01-01 with total page 16 pages. Available in PDF, EPUB and Kindle. Book excerpt: According to its definition, a topological space could be a highly unexpected object. There are spaces (indiscrete space) which have only two open sets: the empty set and the entire space. In a discrete space, on the other hand, each set is open. These two artificial extremes are very rarely seen in actual practice. Most spaces in geometry and analysis fall somewhere between these two types of spaces. Accordingly, the separation axioms allow us to say with confidence whether a topological space contains a sufficient number of open sets to meet our needs. To this end, we use bipolar hypersoft (BHS) sets (one of the efficient tools to deal with ambiguity and vagueness) to define a new kind of separation axioms called BHS e Ti-space (i = 0, 1, 2, 3, 4).


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