A generalization of the hexastix arrangement to higher dimensions

Abstract

Hexastix is an arrangement of non-overlapping infinite hexagonal prisms in four different directions that cover 34 of space. We consider a possible generalization to n dimensions, based on the permutohedral lattice A*n. The central lines of the generalized prisms are going to be oriented in n+1 different directions (parallel to the shortest non-zero vectors of A*n). The projection of the lines oriented in any direction along that direction to a hyperplane perpendicular to it is required to be a translation of the corresponding projection of A*n, and the minimal distance between lines oriented in any two given directions should be maximal. It is shown that this is possible if n is a prime power. Also, the proportion of n-space that is covered is calculated for n ∈ \4, 5\, and an alternative generalization is briefly considered.