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References (8)
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A. Yao, F. Yao (1985)
A general approach to d-dimensional geometric queries -
(1986)
Isometric problems in lp and sections of convex sets -
S. Artstein-Avidan, B. Klartag, V. Milman (2004)
The Santalo point of a function, and a functional form of the Santalo inequalityMathematika, 51
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K. Ball (1997)
An Elementary Introduction to Modern Convex Geometry -
J. Lehec (2009)
On the Yao-Yao partition theoremArchiv der Mathematik, 92
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M. Fradelizi, M. Meyer (2006)
Some functional forms of Blaschke–Santaló inequalityMathematische Zeitschrift, 256
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K. Ball (1997)
An elementary introduction to modern convex geometry, in flavors of geometry -
L. Santaló (2009)
Un Invariante afín para los cuerpos convexos del espacio de n dimensionesPortugaliae Mathematica, 8
- Publisher
- Springer Journals
- Copyright
- Copyright © 2009 by Birkhäuser Verlag Basel/Switzerland
- Subject
- Mathematics; Mathematics, general
- ISSN
- 0003-889X
- eISSN
- 1420-8938
- DOI
- 10.1007/s00013-008-3014-0
- Publisher site
- See Article on Publisher Site
Abstract
We give a direct proof of a functional Santaló inequality due to Fradelizi and Meyer. This provides a new proof of the Blaschke-Santaló inequality. The argument combines a logarithmic form of the Prékopa-Leindler inequality and a partition theorem of Yao and Yao.
Journal
Archiv der Mathematik – Springer Journals
Published: Jan 22, 2009