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isometric isomorphism (Definition)

Let $ (X, \left\Vert\ \right\Vert _X)$ and $ (Y, \left\Vert\ \right\Vert _Y)$ be normed vector spaces. A surjective linear map $ T\colon X \rightarrow Y$ is called an isometric isomorphism between $ X$ and $ Y$ if

$\displaystyle \left\Vert Tx\right\Vert _Y = \left\Vert x\right\Vert _X,\ $   for all$\displaystyle \ x\in X. $

In this case, $ X$ and $ Y$ are said to be isometrically isomorphic.

Two isometrically isomorphic normed vector spaces share the same structure, so they are usually identified with each other.



"isometric isomorphism" is owned by Gorkem.
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See Also: isometry

Also defines:  isometrically isomorphic
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Cross-references: linear map, surjective, normed vector spaces
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This is version 5 of isometric isomorphism, born on 2007-10-05, modified 2007-10-06.
Object id is 9982, canonical name is IsometricIsomorphism.
Accessed 525 times total.

Classification:
AMS MSC46B99 (Functional analysis :: Normed linear spaces and Banach spaces; Banach lattices :: Miscellaneous)
Pending Errata and Addenda
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