Projective versions of the properties in the Scheepers Diagram
Abstract
Let P be a topological property. A.V. Arhangel'skii calls X projectively P if every second countable continuous image of X is P. Lj.D.R. Kocinac characterized the classical covering properties of Menger, Rothberger, Hurewicz and Gerlits-Nagy in term of continuous images in Rω. In this paper we study the functional characterizations of all projective versions of the selection properties in the Scheepers Diagram.
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