On (non-Menger) spaces whose closed nowhere dense subsets are Menger
Abstract
A space X is od-Menger if it satisfies Ufin(X, OX), where OX,X are the collection of covers of X by respectively open subsets and open dense subsets. We show that under CH, there is a refinement of the usual topology on a subset of the reals which yields a hereditarily Lindel\"of, od-Menger, non-Menger, 0-dimensional, first countable space. We also investigate the properties of spaces which are od-Menger but not Menger.
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