Abstract
Let X be a topological space, that is, a space
with open sets such that the union of any collection of open sets is open and the
intersection of any finite number of open sets is open. A covering of
X is a collection of open sets whose union is
X. The covering is called countable if it consists
of a countable collection of open sets or finite if it consists of a finite
collection of open sets ; it is called locally finite if every point of
X is contained in some open set which meets only a
finite number of sets of the covering. A covering is called a
refinement of a covering U if every open set of X is
contained in some open set of . The space
X is called countably paracompact if every countable
covering has a locally finite refinement.
Publisher
Canadian Mathematical Society
Cited by
234 articles.
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