Cardinal Properties of the Space of Quasicontinuous Functions under Topology of Uniform Convergence on Compact Subsets
Abstract
In this paper, we investigate various cardinal properties of the space QCX of all real-valued quasicontinuous functions on the topological space X, under the topology of uniform convergence on compact subsets. It begins by examining the relationship between tightness and other properties in the context of the space X, highlighting results such as the alignment of tightness QCX with the compact Lindel\"of number of X under Hausdorff conditions and the countable tightness of QCX when X is second countable. Further investigations reveal conditions for the tightness of QCX relative to k-covers of X, as well as connections between density tightness, fan tightness, and other properties in Hausdorff spaces. Additionally, we discuss the implications of the Frechet-Urysohn property QCX for open k-covers in Hausdorff spaces. We explore relationships between QCX's tightness, the Frechet-Urysohn property, and the σ-compactness of locally compact Hausdorff spaces X. Furthermore, we examine the kf-covering property and the existence of k-covers in the context of Whyburn spaces.
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