Multi-Robot Motion Planning for Unit Discs with Revolving Areas

TL;DR

This paper addresses multi-robot motion planning for unit discs with revolving areas, presenting a constant-factor approximation algorithm for feasible plans, analyzing complexity, and proposing solutions for online and ordering challenges.

Contribution

It introduces the first constant-factor approximation algorithm for weakly-monotone motion plans in multi-robot systems with revolving areas, and analyzes the problem's computational hardness.

Findings

Minimizing total distance is APX-hard, even with weakly-monotone plans.

A constant-factor approximation algorithm guarantees feasible plans within O(1) of optimal.

An O(log n log log n)-approximation algorithm for optimal robot ordering.

Abstract

We study the problem of motion planning for a collection of $n$ labeled unit disc robots in a polygonal environment. We assume that the robots have revolving areas around their start and final positions: that each start and each final is contained in a radius $2$ disc lying in the free space, not necessarily concentric with the start or final position, which is free from other start or final positions. This assumption allows a weakly-monotone motion plan, in which robots move according to an ordering as follows: during the turn of a robot $R$ in the ordering, it moves fully from its start to final position, while other robots do not leave their revolving areas. As $R$ passes through a revolving area, a robot $R'$ that is inside this area may move within the revolving area to avoid a collision. Notwithstanding the existence of a motion plan, we show that minimizing the total traveled distance in this setting, specifically even when the motion plan is restricted to be weakly-monotone, is APX-hard, ruling out any polynomial-time $(1+\epsilon)$-approximation algorithm. On the positive side, we present the first constant-factor approximation algorithm for computing a feasible weakly-monotone motion plan. The total distance traveled by the robots is within an $O(1)$ factor of that of the optimal motion plan, which need not be weakly monotone. Our algorithm extends to an online setting in which the polygonal environment is fixed but the initial and final positions of robots are specified in an online manner. Finally, we observe that the overhead in the overall cost that we add while editing the paths to avoid robot-robot collision can vary significantly depending on the ordering we chose. Finding the best ordering in this respect is known to be NP-hard, and we provide a polynomial time $O(\log n \log \log n)$-approximation algorithm for this problem.