We consider a variant of reachability in Vector Addition Systems (VAS) dubbed \emph{box reachability}, whereby a vector v∈Nd is box-reachable from 0 in a VAS V if V admits a path from 0 to v that not only stays in the positive orthant (as in the standard VAS semantics), but also stays below v, i.e., within the ``box'' whose opposite corners are 0 and v. Our main result is that for two-dimensional VAS, the set of box-reachable vertices almost coincides with the standard reachability set: the two sets coincide for all vectors whose coordinates are both above some threshold W. We also study properties of box-reachability, exploring the differences and similarities with standard reachability. Technically, our main result is proved using powerful machinery from convex geometry.
Cite
@article{arxiv.2508.12853,
title = {Box-Reachability in Vector Addition Systems},
author = {Shaull Almagor and Itay Hasson and Michał Pilipczuk and Michael Zaslavski},
journal= {arXiv preprint arXiv:2508.12853},
year = {2025}
}