Soft Simply Compact Spaces

On Soft μ-Compact Soft Generalized Topological Spaces

The main purpose of this paper is to introduce soft μ-compact soft generalized topological spaces as a generalization of compact spaces. A soft generalized topological space (FA,μ) is soft μ-compact if every soft μ-open soft cover of FA admits a finite soft sub cover. We characterize soft μ-compact space and study their basic properties.

A Splitting Theorem for Equifocal Submanifolds in Simply Connected Compact Symmetric Spaces

A submanifold in a symmetric space is called equifocal if it has a globally flat abelian normal bundle and its focal data is invariant under normal parallel transportation. This is a generalization of the notion of isoparametric submanifolds in Euclidean spaces. To each equifocal submanifold, we can associate a Coxeter group, which is determined by the focal data at one point. In this paper we ...

Soft Connected Spaces and Soft Paracompact Spaces

Locally Compact, Ω1-compact Spaces

This paper is centered on an extremely general problem: Problem. Is it consistent (perhaps modulo large cardinals) that a locally compact space X must be the union of countably many ω-bounded subspaces if every closed discrete subspace of X is countable [in other words, if X is ω1-compact]? A space is ω-bounded if every countable subset has compact closure. This is a strengthening of countable ...

On exponentiable soft topological spaces

An object $X$ of a category $mathbf{C}$ with finite limits is called exponentiable if the functor $-times X:mathbf{C}rightarrow mathbf{C}$ has a right adjoint. There are many characterizations of the exponentiable  spaces in the category $mathbf{Top}$ of topological spaces. Here, we study the exponentiable objects in the category $mathbf{STop}$ of soft topological spaces which is a generalizati...