Decomposition of balls in R^d

Kiss, Gergely; Somlai, Gabor

doi:10.1112/S0025579315000248

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Article (Scientific journals)

Decomposition of balls in R^d

Kiss, Gergely; Somlai, Gabor

2016 • In Mathematika, 62 (2), p. 378-405

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https://hdl.handle.net/10993/26491

DOI
10.1112/S0025579315000248

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Keywords :

m-divisibility; m-divisibility of the balls in Euclidean space

Abstract :

[en] We investigate the decomposition problem of balls into finitely many congruent pieces in dimension d = 2k. In addition, we prove that the d dimensional unit ball B_d can be divided into finitely many congruent pieces if d = 4 or d ≥ 6. We show that the minimal number of required pieces is less than 20d if d ≥ 10.

Disciplines :

Mathematics

Author, co-author :

Kiss, Gergely ; University of Luxembourg > Faculty of Science, Technology and Communication (FSTC) > Mathematics Research Unit

Somlai, Gabor; Eotvos Lorand University - ELTE > Algebra

External co-authors :

Language :

English

Title :

Decomposition of balls in R^d

Publication date :

2016

Journal title :

Mathematika

ISSN :

2041-7942

Publisher :

London Mathematical Society, London, United Kingdom

Volume :

Issue :

Pages :

378-405.

Peer reviewed :

Peer Reviewed verified by ORBi

Available on ORBilu :

since 08 April 2016

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