Mazur–Ulam theorem
In mathematics, the Mazur–Ulam theorem states that if and are normed spaces over R and the mapping
is a surjective isometry, then is affine.
It is named after Stanisław Mazur and Stanislaw Ulam in response to an issue raised by Stefan Banach.
References
- Richard J. Fleming; James E. Jamison (2003). Isometries on Banach Spaces: Function Spaces. CRC Press. p. 6. ISBN 1-58488-040-6.
- Stanisław Mazur; Stanisław Ulam (1932). "Sur les transformationes isométriques d'espaces vectoriels normés". C. R. Acad. Sci. Paris. 194: 946–948.
External links
- Jussi Väisälä A proof of the Mazur-Ulam theorem.
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