On the multiplicity of arrangements of congruent zones on the sphere

Abstract

Consider an arrangement of n congruent zones on the d-dimensional unit sphere Sd-1, where a zone is the intersection of an origin symmetric Euclidean plank with Sd-1. We prove that, for sufficiently large n, it is possible to arrange n congruent zones of suitable width on Sd-1 such that no point belongs to more than a constant number of zones, where the constant depends only on the dimension and the width of the zones. Furthermore, we also show that it is possible to cover Sd-1 by n congruent zones such that each point of Sd-1 belongs to at most Ad n zones, where the Ad is a constant that depends only on d. This extends the corresponding 3-dimensional result of Frankl, Nagy and Nasz\'odi (2016). Moreover, we also examine coverings of Sd-1 with congruent zones under the condition that each point of the sphere belongs to the interior of at most d-1 zones.