Illuminating spindle convex bodies and minimizing the volume of
  spherical sets of constant width

B.V. Dekster; B.V. Dekster; C.A. Rogers; C.B. Allendoerfer; E. Meissner; H. Hadwiger; H. Martini; I. Dumer; I. Papadoperakis; J. Kahn; K. Bezdek; K. Bezdek; K. Bezdek; Károly Bezdek; L.A. Santaló; L.A. Santaló; M. Aigner; M. Lassak; O. Schramm; P. Erdős; P. Erdős; P.W. Fowler; T. Bayen; V. Boltyanski; V. Boltyanski; W. Blaschke

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Illuminating spindle convex bodies and minimizing the volume of spherical sets of constant width

Authors: B.V. Dekster
B.V. Dekster
C.A. Rogers
C.B. Allendoerfer
E. Meissner
H. Hadwiger
H. Martini
I. Dumer
I. Papadoperakis
J. Kahn
K. Bezdek
K. Bezdek
K. Bezdek
Károly Bezdek
L.A. Santaló
L.A. Santaló
M. Aigner
M. Lassak
O. Schramm
P. Erdős
P. Erdős
P.W. Fowler
T. Bayen
V. Boltyanski
V. Boltyanski
W. Blaschke
Publication date: 1 January 2011
Publisher: 'Springer Science and Business Media LLC'
Doi

Abstract

A subset of the d-dimensional Euclidean space having nonempty interior is called a spindle convex body if it is the intersection of (finitely or infinitely many) congruent d-dimensional closed balls. The spindle convex body is called a "fat" one, if it contains the centers of its generating balls. The core part of this paper is an extension of Schramm's theorem and its proof on illuminating convex bodies of constant width to the family of "fat" spindle convex bodies.Comment: 17 page

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