On certain weaker forms of the Scheepers property

Abstract

We introduce the weaker forms of the Scheepers property, namely almost Scheepers ( aS), weakly Scheepers in the sense of Sakai ( wS) and weakly Scheepers in the sense of Kocinac ( wSk). We explore many topological properties of the weaker forms of the Scheepers property and present few illustrative examples to make distinction between these spaces. Certain situations are considered when all the weaker forms are equivalent. We also make investigations on the weak variations as considered in this paper concerning cardinalities. In particular we observe that 1. If every finite power of a space X is aM (respectively, wM), then X is aS (respectively, wS). 2. Every almost Lindel\"of space of cardinality less than d is aS. 3. Let X be Lindel\"of and < d. If X is a union of many aH (respectively, wH, wHk) spaces, then X is aS (respectively, wS, wSk). 4. The Alexandroff duplicate AD(X) of a space X has the Scheepers property if and only if AD(X) has the wSk property. 5. If AD(X) is aS (respectively, wS), then X is also aS (respectively, wS). Besides, few observations on productively aS, productively wS and productively wSk spaces are presented. Some open problems are also given.

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