- E92
[0MH] Prerequisites:[0KS]. If \((X,𝜏)\) satisfies the second axiom of countability, given \(A⊆ X\) there exists a countable subset \(B⊆ A\) such that \(\overline B⊇ A\). In particular, the whole space \(X\) admits a dense countable subset: \(X\) is said to be separable. The vice versa holds for example in metric spaces, see [0Q7]. See also [0SQ] for an application in \(ℝ^ n\).
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Authors:
"Mennucci , Andrea C. G."
.
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Book index
Book index
- separable space
- second axiom of countability
- axiom, second --- of countability
- space, separable
- space, topological
- topological space
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