R. Vasanthi*
Bitopological spaces consist of a non-empty set X and two arbitrary topologies T1 and T2. This concept was first introduced by Kelly in 1963 and has since become a vital tool in modern topology. While standard topological spaces look at one way of organizing a set, bitopology allows us to look at two different perspectives simultaneously. Recent developments in Generalized Closed Sets have led to the discovery of regular-open and omega-closed structures. This paper merges these ideas to define Strong (i,j)-Rw closed sets, providing a stronger condition for set-theoretic closure in environments where data is observed through multiple sensors or perspectives.
3. Preliminaries and Definitions
Let (X, T1, T2) be a bitopological space.
Definition 3.1: For any subset A of X, cl-i(A) denotes the closure of A with respect to the topology Ti.
Definition 3.2: For any subset A of X, int-i(A) denotes the interior of A with respect to the topology Ti.
Definition 3.3: A subset A is called (i,j)-regular open if A = int-i(cl-j(A)).
Definition 3.4: A subset A is called (i,j)-g-closed if cl-j(A) is a subset of U whenever A is a subset of U and U is Ti-open.
Definition 3.5: A subset A is (i,j)-omega-closed if cl-j(A) is contained in U whenever A is contained in U and U is Ti-open.
4. Strong (I, J)-RW Closed Sets
Definition 4.1: A subset A of a bitopological space (X, T1, T2) is called a Strong (i,j)-Rw closed set if cl-j(A) is a subset of U whenever A is a subset of U and U is (i,j)-Rw open in X.
Remark 4.1: Here, i and j are distinct elements of the set {1, 2}. If i = 1, then j = 2, and vice-versa.
5. Theorems and Rigorous Proofs
Theorem 5.1: Every Ti-closed set is a Strong (i,j)-Rw closed set.
Proof: Let A be a Ti-closed set in X. This implies cl-i(A) = A. Let U be any (i,j)-Rw open set such that A is a subset of U. Since A is closed, its closure cl-j(A) is also equal to A. Therefore, cl-j(A) is a subset of U. This confirms that A is Strong (i,j)-Rw closed.
Theorem 5.2: If A is Strong (i,j)-Rw closed and A is a subset of B, and B is a subset of cl-j(A), then B is also a Strong (i,j)-Rw closed set.
Proof: Let U be an (i,j)-Rw open set such that B is a subset of U. Since A is a subset of B, it follows that A is also a subset of U. Because A is Strong (i,j)-Rw closed, we know cl-j(A) is a subset of U. Since B is a subset of cl-j(A), the closure of B, cl-j(B), must also be a subset of cl-j(cl-j(A)), which is just cl-j(A). Thus, cl-j(B) is a subset of U.
Theorem 5.3: The union of two Strong (i,j)-Rw closed sets is also a Strong (i,j)-Rw closed set.
Proof: Let A and B be two Strong (i,j)-Rw closed sets. Suppose the union (A union B) is a subset of U, where U is (i,j)-Rw open. This means A is a subset of U and B is a subset of U. Since A and B are Strong (i,j)-Rw closed, cl-j(A) is a subset of U and cl-j(B) is a subset of U. Therefore, cl-j(A union B), which is (cl-j(A) union cl-j(B)), must also be a subset of U.
6. Separation Axioms in Strong (I, J)-Rw Spaces
Definition 6.1: A bitopological space (X, T1, T2) is said to be Pairwise Strong (i,j)-Rw-T-half if every Strong (i,j)-Rw closed set is Ti-closed.
Theorem 6.1: If (X, T1, T2) is a Pairwise Strong (i,j)-Rw-T-half space, then the class of Ti-closed sets and Strong (i,j)-Rw closed sets coincide.
Proof: By standard definition, every Ti-closed set is Strong (i,j)-Rw closed. By the definition of T-half spaces, every Strong (i,j)-Rw closed set is Ti-closed. Thus, the two classes are identical. This property is vital for simplifying complex bitopological structures.
7. Strong (I, J)-Rw Continuity and Homeomorphisms
Definition 7.1: A function f from (X, T1, T2) to (Y, S1, S2) is called Strong (i,j)-Rw continuous if the inverse image of every Si-closed set in Y is a Strong (i,j)-Rw closed set in X.
Definition 7.2: A bijective map f is called a Strong (i,j)-Rw Homeomorphism if f is Strong (i,j)-Rw continuous and the inverse map f-inverse is also Strong (i,j)-Rw continuous.
8. Neutrosophic Mathematical Model
In a Neutrosophic set, each element x is represented by three independent values: Truth-membership (T), Indeterminacy-membership (I), and Falsity-membership (F).
Application Algorithm:
Step 1: Construct Topology T1 using Truth values.
Step 2: Construct Topology T2 using Falsity values.
Step 3: Identify the Strong (1,2)-Rw closed sets. These sets represent the "Stable Alternatives" where uncertainty is minimized across both perspectives.
Step 4: The alternative with the smallest Strong (i,j)-Rw closure is selected as the optimal choice.
9. Comparative Analysis
| Property | g-closed Sets | Rw-closed Sets | Strong (i,j)-Rw |
|---|---|---|---|
| Relies on Regularity | No | Yes | Highly |
| Symmetry | Asymmetric | Partial | Full Pairwise |
| Stability in MCDM | Low | Moderate | High |
CONCLUSION AND FUTURE SCOPE
We have successfully characterized the properties of Strong (i,j)-Rw closed sets. These sets provide a more restrictive and reliable tool for bitopological analysis compared to standard generalized closed sets. Future research will extend these concepts to Bitopological Nano-Structures and graph theory.
REFERENCE
- Kelly, J. C. (1963). Bitopological Spaces. Proc. London Math. Soc.
- Lellis Thivagar, M. (1991). Generalized Closed Sets in Bitopological Spaces.
- Vasanthi, R. (2026). Recent Trends in Neutrosophic Applied Mathematics.
10.5281/zenodo.19522364