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| Both sides previous revision Previous revision Next revision | Previous revision Next revision Both sides next revision | ||
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banach_space [2014/03/24 19:37] nikolaj |
banach_space [2015/02/03 10:17] nikolaj |
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| | @#55EE55: postulate | @#55EE55: $\exists v_\infty.\,\mathrm{lim}_{n\to\infty}\Vert v_n-v_\infty \Vert = 0$ | | | @#55EE55: postulate | @#55EE55: $\exists v_\infty.\,\mathrm{lim}_{n\to\infty}\Vert v_n-v_\infty \Vert = 0$ | | ||
| - | ==== Discussion ==== | + | ----- |
| For each Cauchy sequence $(v)_{i\in\mathbb N}$, there is a limit $v_\infty\in\mathcal V$ w.r.t. the natural norm. $\Longleftrightarrow$ The space $\mathcal V$ is complete. | For each Cauchy sequence $(v)_{i\in\mathbb N}$, there is a limit $v_\infty\in\mathcal V$ w.r.t. the natural norm. $\Longleftrightarrow$ The space $\mathcal V$ is complete. | ||
| === Reference === | === Reference === | ||
| Wikipedia: [[http://en.wikipedia.org/wiki/Banach_space|Banach space]] | Wikipedia: [[http://en.wikipedia.org/wiki/Banach_space|Banach space]] | ||
| - | ==== Parents ==== | + | |
| + | ----- | ||
| === Subset of === | === Subset of === | ||
| [[Normed vector space]] | [[Normed vector space]] | ||
| - | === Context === | + | === Requirements === |
| [[Cauchy sequence]] | [[Cauchy sequence]] | ||
