Minimum-Link Covering Trails for any Hypercubic Lattice
Abstract
In 1994, Kranakis et al. published a conjecture about the minimum link-length of every rectilinear covering path for the -dimensional grid . In this paper, we consider the general, NP-complete, Line-Cover problem, where the edges are not required to be axis-parallel, showing that the original Theorem 1 by Kranakis et al. no longer holds when the aforementioned constraint is disregarded. Furthermore, for any greater than two, as approaches infinity, the link-length of any minimal (non-rectilinear) polygonal chain does not exceed Kranakis' conjectured value of only if we introduce a multiplicative constant for the lower order terms (e.g., if we select and assume that , starting from a sufficiently large , it is not possible to visit all the nodes of with a trail of link-length ).
Cite
@article{arxiv.2208.01699,
title = {Minimum-Link Covering Trails for any Hypercubic Lattice},
author = {Marco Ripà},
journal= {arXiv preprint arXiv:2208.01699},
year = {2025}
}
Comments
5 pages, extending and substantially improving some previously published results in Int. Journal of Math. Arch., vol. 10(8), pp. 36-38 (2019); minor stylistic corrections, Reference [8] fixed; rephrasing Definitions 1.2 and 1.4, revising notations, and fixing/unifying the general lower bound provided by Theorem 2.1 to match the earlier statement