Difference between revisions of "Divergent sequence"

Latest revision as of 20:54, 17 December 2016

A sequence of points in a topological space without a limit. Every divergent sequence in a compact metric space contains a convergent subsequence. In the class of divergent sequences in a normed space one can find infinitely large sequences, i.e. sequences $\{x_n\}$ of points such that $\lim\limits_{n\to\infty}\|x_n\|=\infty$. The concept of a divergent sequence can be generalized to multiple sequences and to sequences in directed (partially ordered) sets.

Revision as of 06:53, 23 January 2013 (view source) Nikita2 (talk \| contribs) m (TeX encoding is done) ← Older edit		Latest revision as of 20:54, 17 December 2016 (view source) Richard Pinch (talk \| contribs) (See also Convergence, types of)
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−	A sequence of points in a topological space without a limit. Every divergent sequence in a compact metric space contains a convergent subsequence. In the class of divergent sequences in a normed space one can find infinitely large sequences, i.e. sequences $\{x_n\}$ of points such that $\lim\limits_{n\to\infty}\\|x_n\\|=\infty.$ be generalized to multiple sequences and to sequences in directed (partially ordered) sets.	+	A sequence of points in a topological space without a limit. Every divergent sequence in a compact metric space contains a convergent subsequence. In the class of divergent sequences in a normed space one can find infinitely large sequences, i.e. sequences $\{x_n\}$ of points such that $\lim\limits_{n\to\infty}\\|x_n\\|=\infty$. The concept of a divergent sequence can be generalized to multiple sequences and to sequences in directed (partially ordered) sets.
		+
		+	See also: [[Convergence, types of]].

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Difference between revisions of "Divergent sequence"

Latest revision as of 20:54, 17 December 2016