The layer number of grids

Abstract

The peeling process is defined as follows: starting with a finite point set X ⊂ Rd, we repeatedly remove the set of vertices of the convex hull of the current set of points. The number of peeling steps needed to completely delete the set X is called the layer number of X. In this paper, we study the layer number of the d-dimensional integer grid [n]d. We prove that for every d ≥ 1, the layer number of [n]d is at least (n2dd+1). On the other hand, we show that for every d≥ 3, it takes at most O(nd - 9/11) steps to fully remove [n]d. Our approach is based on an enhancement of the method used by Har-Peled and Lidick\'y for solving the 2-dimensional case.