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An Inequality between the parts into which a convex body is divided by a plane section

A new proof is given of an inequality of ]. Bokowski and E. Sperner, referring to the product of the volume of the two parts into which a convex body is divided by a plane. The proof, which is given for dimensions n = 2,1 uses known formulas of Integral Geometry and is generalized to convex bodies of the elliptic and hyperbolic spaces

Circolo matematico di Palermo

Autor: Santaló, Lluís
Data: 1983
Resum: A new proof is given of an inequality of ]. Bokowski and E. Sperner, referring to the product of the volume of the two parts into which a convex body is divided by a plane. The proof, which is given for dimensions n = 2,1 uses known formulas of Integral Geometry and is generalized to convex bodies of the elliptic and hyperbolic spaces
Format: application/pdf
ISSN: 0009-725X
Altres identificadors: Santaló, L. (1983). An Inequality between the parts into which a convex body is divided by a plane section. Rendiconti del circolo matematico di Palermo : Serie II, 32, 124-130
Accés al document: http://hdl.handle.net/10256.2/8251
Llenguatge: eng
Editor: Circolo matematico di Palermo
Drets: Tots els drets reservats
Títol: An Inequality between the parts into which a convex body is divided by a plane section
Tipus: article
Repositori: DUGiFonsEspecials

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