Normed space: Difference between revisions
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In [[mathematics]], a '''normed space''' is a [[vector space]] that is endowed with a [[norm (mathematics)]]. A [[completeness|complete]] normed space is called a [[Banach space]]. | In [[mathematics]], a '''normed space''' is a [[vector space]] that is endowed with a [[norm (mathematics)|norm]]. A [[completeness|complete]] normed space is called a [[Banach space]]. | ||
==Examples of normed spaces== | ==Examples of normed spaces== | ||
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* [[Inner product space]] | * [[Inner product space]] | ||
* [[Banach space]] | * [[Banach space]] | ||
* [[Hilbert space]] | * [[Hilbert space]][[Category:Suggestion Bot Tag]] |
Latest revision as of 16:01, 26 September 2024
In mathematics, a normed space is a vector space that is endowed with a norm. A complete normed space is called a Banach space.
Examples of normed spaces
- The Euclidean space endowed with the Euclidean norm for all . This is the canonical example of a finite dimensional vector space; in fact all finite dimensional real normed spaces of dimension n are isomorphic to this space and, indeed, to one another.
- The space of the equivalence class of all real valued bounded Lebesgue measurable functions on the interval [0,1] with the norm . This is an example of an infinite dimensional normed space.