Totally bounded set: Difference between revisions

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==Formal definition==
==Formal definition==
Let ''X'' be a metric space. A set <math>A \subset X</math> is totally bounded if for any radius ''r>0'' the exist a finite number ''n(r)'' (that depends on the value of ''r'') of [[metric space#Metric topology|open balls]] <math>B_r(x_1),\ldots,B_r(x_{n(r)})</math>, with <math>x_1,\ldots,x_{n(r)} \in X</math>, such that <math>A \subset \cup_{k=1}^{n(r)}B_r(x_{k})</math>.
Let ''X'' be a metric space. A set <math>A \subset X</math> is totally bounded if for any [[real number]] ''r''>0 there exists a finite number ''n''(''r'') (that depends on the value of ''r'') of [[metric space#Metric topology|open balls]] of radius ''r'', <math>B_r(x_1),\ldots,B_r(x_{n(r)})\,</math>, with <math>x_1,\ldots,x_{n(r)} \in X</math>, such that <math>A \subseteq \cup_{k=1}^{n(r)}B_r(x_{k})</math>.


==Properties==
==Properties==
* A subset of a [[complete metric space]] is totally bounded if and only if its [[closure (mathematics)|closure]] is [[compact space|compact]].
* A subset of a [[complete metric space]] is totally bounded if and only if its [[closure (mathematics)|closure]] is [[compact space|compact]].

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In mathematics, a totally bounded set is any subset of a metric space with the property that for any positive radius r>0 it is contained in some union of a finite number of "open balls" of radius r. In a finite dimensional normed space, such as the Euclidean spaces, total boundedness is equivalent to boundedness.

Formal definition

Let X be a metric space. A set is totally bounded if for any real number r>0 there exists a finite number n(r) (that depends on the value of r) of open balls of radius r, , with , such that .

Properties