Weak and Strong Forms of ω-Perfect Mappings

Abstract: In this paper, we introduce weak and strong forms of ω-perfect mappings, namely the -ω-perfect, weakly -ω-perfect and strongly-ω-perfect mappings. Also, we investigate the fundamental properties of these mappings. Finally, we focused on studying the relationship between weakly -ω-perfect and strongly -ω-perfect mappings.

“…As the applications have been increasingly appearing in multiple aspects in mathematics, there has been a growing interest in this concept [13,14]. Our research topic has further relations with additional previous works [15,16]. In this paper, we introduce the concept of cutpoints, with the topological viewpoint in -connected topological spaces, and study separations and connectedness in the -topological spaces.…”

CutPoints and Separations in Alpha- Connected Topological Spaces

“…As the applications have been increasingly appearing in multiple aspects in mathematics, there has been a growing interest in this concept [13,14]. Our research topic has further relations with additional previous works [15,16]. In this paper, we introduce the concept of cutpoints, with the topological viewpoint in -connected topological spaces, and study separations and connectedness in the -topological spaces.…”

CutPoints and Separations in Alpha- Connected Topological Spaces

“…introduced the concept of nano topological spaces with respect to a subset G of a universe U, which known as terms of approximations and boundary region of a subset of an universe using an equivalence relation on it and also known as nano-closed-sets, nano-interior and nano-closure. [2] introduced fibrewise IJ-Perfect bitopological spaces and [3] introduced weak and strong forms of ωperfect mappings. [4] introduced R𝛼-compactness on bitopological spaces.…”

Some Results on Nano Perfect Mappings

“…The intersection of wp closed sets containing A we call it wp closer of A. the largest wp open set contained in A we call it wp interior of A. There are more researches about w-open set [1][2][3][4][5].…”

New Types of Separation Axioms via Wp-Open Sets