Tube lemma: Difference between revisions

Revision as of 10:10, 20 August 2007

Statement

Let $X$ be a compact space and $A$ any topological space. Consider $X \times A$ endowed with the product topology. Suppose $a \in A$ and $U$ is an open subset of $X \times A$ containing the entire slice $X \times {a}$ . Then, we can find an open subset $V$ of $A$ such that:

$a \in V$ , and $X \times V \subseteq A$

In other words, any open subset containing a slice, contains an [open cylinder]] that contains the slice.

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			{{result related to\|compactness}}

	==Statement==		==Statement==