About: Contraction (operator theory)

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In operator theory, a bounded operator T: X → Y between normed vector spaces X and Y is said to be a contraction if its operator norm ||T || ≤ 1. This notion is a special case of the concept of a contraction mapping, but every bounded operator becomes a contraction after suitable scaling. The analysis of contractions provides insight into the structure of operators, or a family of operators. The theory of contractions on Hilbert space is largely due to Béla Szőkefalvi-Nagy and Ciprian Foias.

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dbo:abstract	In operator theory, a bounded operator T: X → Y between normed vector spaces X and Y is said to be a contraction if its operator norm \|\|T \|\| ≤ 1. This notion is a special case of the concept of a contraction mapping, but every bounded operator becomes a contraction after suitable scaling. The analysis of contractions provides insight into the structure of operators, or a family of operators. The theory of contractions on Hilbert space is largely due to Béla Szőkefalvi-Nagy and Ciprian Foias. (en)
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rdfs:comment	In operator theory, a bounded operator T: X → Y between normed vector spaces X and Y is said to be a contraction if its operator norm \|\|T \|\| ≤ 1. This notion is a special case of the concept of a contraction mapping, but every bounded operator becomes a contraction after suitable scaling. The analysis of contractions provides insight into the structure of operators, or a family of operators. The theory of contractions on Hilbert space is largely due to Béla Szőkefalvi-Nagy and Ciprian Foias. (en)
rdfs:label	Contraction (operator theory) (en)
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About: Contraction (operator theory)

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