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Alonso, Javier
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Surveys in Geometry I.
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Pythagorean Orthogonality in a Normed Linear Space
Published online by Cambridge University Press: 20 January 2009
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This note presents a proof of the following proposition:
Theorem. If Pythagorean orthogonality is homogeneous in a normed linear space T then T is an abstract Euclidean space.
The theorem was originally stated and proved by R. C. James ([1], Theorem 5. 2) who systematically discusses various characterisations of a Euclidean space in terms of concepts of orthogonality. I came across the result independently and the proof which I constructed is a simplified version of that of James. The hypothesis of the theorem may be stated in the form:
Since a normed linear space is known to be Euclidean if the parallelogram law:
is valid throughout the space (see [2]), it is evidently sufficient to show that (l) implies (2).
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- Copyright © Edinburgh Mathematical Society 1958
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REFERENCES
[1] James, R. C., “Orthogonality in normed linear spaces”, Duke Math. J., 12 (1945), 291–302.CrossRefGoogle Scholar
[2] Jordan, P. and von Neumann, J., “On inner products in linear metric spaces”, Annals of Math., 36 (1935), 719––723.CrossRefGoogle Scholar
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