English

Tight Bounds for Deterministic High-Dimensional Grid Exploration

Distributed, Parallel, and Cluster Computing 2020-05-27 v1 Multiagent Systems

Abstract

We study the problem of exploring an oriented grid with autonomous agents governed by finite automata. In the case of a 2-dimensional grid, the question how many agents are required to explore the grid, or equivalently, find a hidden treasure in the grid, is fully understood in both the synchronous and the semi-synchronous setting. For higher dimensions, Dobrev, Narayanan, Opatrny, and Pankratov [ICALP'19] showed very recently that, surprisingly, a (small) constant number of agents suffices to find the treasure, independent of the number of dimensions, thereby disproving a conjecture by Cohen, Emek, Louidor, and Uitto [SODA'17]. Dobrev et al. left as an open question whether their bounds on the number of agents can be improved. We answer this question in the affirmative for deterministic finite automata: we show that 3 synchronous and 4 semi-synchronous agents suffice to explore an nn-dimensional grid for any constant nn. The bounds are optimal and notably, the matching lower bounds already hold in the 2-dimensional case. Our techniques can also be used to make progress on other open questions asked by Dobrev et al.: we prove that 4 synchronous and 5 semi-synchronous agents suffice for polynomial-time exploration, and we show that, under a natural assumption, 3 synchronous and 4 semi-synchronous agents suffice to explore unoriented grids of arbitrary dimension (which, again, is tight).

Cite

@article{arxiv.2005.12623,
  title  = {Tight Bounds for Deterministic High-Dimensional Grid Exploration},
  author = {Sebastian Brandt and Julian Portmann and Jara Uitto},
  journal= {arXiv preprint arXiv:2005.12623},
  year   = {2020}
}
R2 v1 2026-06-23T15:48:59.182Z