Heterogeneous Multi-Robot Graph Coverage with Proximity and Movement Constraints
Abstract
Multi-Robot Coverage problems have been extensively studied in robotics, planning and multi-agent systems. In this work, we consider the coverage problem when there are constraints on the proximity (e.g., maximum distance between the agents, or a blue agent must be adjacent to a red agent) and the movement (e.g., terrain traversability and material load capacity) of the robots. Such constraints naturally arise in many real-world applications, e.g. in search-and-rescue and maintenance operations. Given such a setting, the goal is to compute a covering tour of the graph with a minimum number of steps, and that adheres to the proximity and movement constraints. For this problem, our contributions are four: (i) a formal formulation of the problem, (ii) an exact algorithm that is FPT in F, d and tw, the set of robot formations that encode the proximity constraints, the maximum nodes degree, and the tree-width of the graph, respectively, (iii) for the case that the graph is a tree: a PTAS approximation scheme, that given an approximation parameter epsilon, produces a tour that is within a epsilon times error(||F||, d) of the optimal one, and the computation runs in time poly(n) times h(1/epsilon,||F||). (iv) for the case that the graph is a tree, with robots, and the constraint is that all agents are connected: a PTAS scheme with multiplicative approximation error of 1+O(epsilon), independent of the maximal degree d.
Cite
@article{arxiv.2412.10083,
title = {Heterogeneous Multi-Robot Graph Coverage with Proximity and Movement Constraints},
author = {Dolev Mutzari and Yonatan Aumann and Sarit Kraus},
journal= {arXiv preprint arXiv:2412.10083},
year = {2024}
}
Comments
12 pages, 7 figures, to be published in the 39th Annual AAAI Conference on Artificial Intelligence