On IK-Convergence in a Topological space via semi-open sets

Abstract

In this article, we consider IK-convergence to define a new concept of convergence namely, S-IK-convergence which generalizes the notion of S-I-convergence introduced by Guevara et al. GSR20 recently. Some properties of S-IK-convergence of sequences and its relation with compact sets are discussed. In particular, we investigate the relation between semi-compactness and semi-Lindeloffness by introducing the notion of S-IK-cluster point of a sequence. The "Equivalence between semi-dense and dense sets" is utilized to characterize the set of S-IK-cluster points of a sequence as semi-closed subsets of a topological space. Moreover, in product space, we obtain some results for IK-convergence which also holds for S-IK-convergence.