全等球交点的内禀体积

Pub Date : 2022-05-01 DOI:10.1016/j.disopt.2019.03.002
Károly Bezdek
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引用次数: 9

摘要

设Ed表示d维欧几里德空间。由给定集合在Ed中生成的r球体是以给定集合的点为中心的半径为r的球的交。本文证明了r-球体的下述Blaschke-Santaló-type不等式:对于所有1≤k≤d,对于Ed中给定体积的任何集合,如果集合是球,则由该集合生成的r-球体的第k个固有体积是极大的。作为应用,我们研究了Ed中同余球的Gromov-Klee-Wagon问题,该问题是关于证明或否证如果Ed中N个同余球族的中心收缩,则相交的体积不减小的问题。特别地,我们研究了一致收缩的问题,当第一组中心的所有成对距离大于第二组中心的所有成对距离时,即当两组中心的成对距离被某个正实数隔开时。Bezdek和Naszódi(2018)证明了当N≥1+2d时,N个全等球在Ed, d>1中的交点在中心点的任意均匀收缩下,其固有体积增大。我们利用r球体的Blaschke-Santaló-type不等式对这一结果作了简短的证明,并在d≥42时加以改进。
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On the intrinsic volumes of intersections of congruent balls

Let Ed denote the d-dimensional Euclidean space. The r-ball body generated by a given set in Ed is the intersection of balls of radius r centered at the points of the given set. In this paper we prove the following Blaschke–Santaló-type inequalities for r-ball bodies: for all 1kd and for any set of given volume in Ed the kth intrinsic volume of the r-ball body generated by the set becomes maximal if the set is a ball. As an application we investigate the Gromov–Klee–Wagon problem for congruent balls in Ed, which is a question on proving or disproving that if the centers of a family of N congruent balls in Ed are contracted, then the volume of the intersection does not decrease. In particular, we investigate this problem for uniform contractions, which are contractions where all the pairwise distances in the first set of centers are larger than all the pairwise distances in the second set of centers, that is, when the pairwise distances of the two sets are separated by some positive real number. Bezdek and Naszódi (2018), proved that the intrinsic volumes of the intersection of N congruent balls in Ed, d>1 increase under any uniform contraction of the center points when N1+2d. We give a short proof of this result using the Blaschke–Santaló-type inequalities of r-ball bodies and improve it for d42.

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