G-Sequential Convergences in  Submethods: G-Sequential Convergences in  Submethods

Osman Mucuk; Shanza Behram

doi:10.5269/bspm.81453

Authors

Osman Mucuk Erciyes University http://orcid.org/0000-0001-7411-2871
Shanza Behram

DOI:

https://doi.org/10.5269/bspm.81453

Abstract

In a topological space $X$, limits of sequences give us a set valued function defined for convergent sequences and taking the subsets of $X$ as values. Then sequential versions of some topological notions are generalised to $G$-methods by replacing $\lim$ function with any map $G$. A $G$-method enables us to define a variety of convergence $G_s$ called $G$-sequentially convergence and gives rise to a method $G_Y$ on a subset $Y\subseteq X$ called submethod. In this paper, we consider $G$-sequentially methods or $G_s$-methods created by $G$-methods and search the reducibility of such methods to the subsets with some properties and characterisations.