Abstract
In this article, the notions are introduced by using soft ideal and soft semi-open sets, which are - - - -closed sets " -closed" where many of the properties of these sets are clarified. Some games by using soft- -semi, soft separation axioms: like ( 0 ( 0 Using many figures and proposition to study the relationships among these kinds of games with some examples are explained.
Highlights
In 2011, Shaber [1] introduced soft topological spaces
Kandil used the soft ideal which is a family of soft sets that meet hereditary and finite additively property of χ to study the notion of soft logical function [5], which was the starting point for studying the properties of soft ideal topological spaces (χ, T, H, I) and defined new types of near open soft sets and studied their properties as [6,7,8]
A pair (Г, H) is a soft set over χ where, Г is a function given by Г ∶ H → p(χ)
Summary
In 2011, Shaber [1] introduced soft topological spaces. Shaber have been introduced to study many topological properties by using soft set like derived sets, compactness, separation axioms and other properties. [2,3,4]. Definition 3.1: In soft ideal topological space (χ , T, H, I), let (Г, H) ∈ ŞŞO(χ), (Г, H) is a soft-I-semi-g-closed set (briefly sIsg-closed).
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