Certain results on selection principles associated with bornological structure in topological spaces
Abstract
We study selection principles related to bornological covers in a topological space X following the work of Aurichi et al., 2019, where selection principles have been investigated in the function space CB(X) endowed with the topology τB of uniform convergence on bornology B. We show equivalences among certain selection principles and present some game theoretic observations involving bornological covers. We investigate selection principles on the product space Xn equipped with the product bornolgy Bn, n∈ ω. Considering the cardinal invariants such as the unbounding number (b), dominating numbers (d), pseudointersection numbers (p) etc., we establish connections between the cardinality of base of a bornology with certain selection principles. Finally, we investigate some variations of the tightness properties of CB(X) and present their characterizations in terms of selective bornological covering properties of X.
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