Tropical balls, geodesics and honeycomb

Abstract

In these notes we describe the geometry of tropical balls in Rn equipped with the tropical metric. After defining the tropical length of rectifiable curves (and not just piecewise linear curves), we characterize compact tropically geodesic sets in Rn. Next, we describe the tropical unit ball as a zonotope, via its tropical generating set, as a union of n+1 tropical unit hypercubes, and as the tropical geodesic hull of the tropical unit vectors. Finally, we show that translates of the tropical unit ball whose centers lie in a sublattice of Zn form a facet-to-facet honeycomb tiling of Rn. We note that a great part of the material presented here is either known or implied from known results.