Abstract
The importance of soft separation axioms comes from their vital role in classifications of soft spaces, and their interesting properties are studied. This article is devoted to introducing the concepts of t t -soft semi- T i i = 0 , 1 , 2 , 3 , 4 and t t -soft semiregular spaces with respect to ordinary points. We formulate them by utilizing the relations of total belong and total nonbelong. The advantages behind using these relations are, first, generalization of existing comparable properties on general topology and, second, eliminating the stability shape of soft open and closed subsets of soft semiregular spaces. By some examples, we show the relationships between them as well as with soft semi- T i i = 0 , 1 , 2 , 3 , 4 and soft semiregular spaces. Also, we explore under what conditions they are kept between soft topology and its parametric topologies. We characterize a t t -soft semiregular space and demonstrate that it guarantees the equivalence of t t -soft semi- T i i = 0 , 1 , 2 . Further, we investigate some interrelations of them and some soft topological notions such as soft compactness, product soft spaces, and sum of soft topological spaces. Finally, we define a concept of semifixed soft point and study its main properties.
Highlights
In daily life, human beings face different kinds of uncertainties in fields such as economics, environmental and social sciences, engineering, medicine etc
[6] A family Ω of soft sets over X under a fixed set of parameters P is said to be a soft topology on X if it satisfies the following: (i) X~ and Φ~ are elements of Ω
The following result will help us establish some properties of soft semiseparation axioms and soft semicompact spaces. It implies that the family of soft semiopen subsets of a soft hyperconnected space ðX, Ω, PÞ forms a new soft topology Ωsemi over X that is finer than Ω
Summary
Human beings face different kinds of uncertainties in fields such as economics, environmental and social sciences, engineering, medicine etc. In 2018, the Journal of Applied Mathematics authors of [16] came up new relations of belong and nonbelong between an ordinary points and soft set, namely partial belong and total nonbelong relations These relations widely open the door to study and redefine many soft topological notions. Al-shami and Kocinac [31] discussed the equivalence between these two topologies and obtained interesting results They [32] have introduced the concept of nearly soft Menger spaces and investigated main characteristics.
Sign-in/Register to view highlights & summary Sign-in/Register to access full text options 
Free) 
Talk to us
Join us for a 30 min session where you can share your feedback and ask us any queries you have
Schedule a call
