RAnGE: Reachability Analysis for Guaranteed Ergodicity

This paper investigates performance guarantees on coverage-based ergodic exploration methods in environments containing disturbances. Ergodic exploration methods generate trajectories for autonomous robots such that time spent in an area is proportional to the utility of exploring in the area. However, providing formal performance guarantees for ergodic exploration methods is still an open challenge due to the complexities in the problem formulation. In this work, we propose to formulate ergodic search as a differential game, in which a controller and external disturbance force seek to minimize and maximize the ergodic metric, respectively. Through an extended-state Bolza-form transform of the ergodic problem, we demonstrate it is possible to use techniques from reachability analysis to solve for optimal controllers that guarantee coverage and are robust against disturbances. Our approach leverages neural-network based methods to obtain approximate value function solutions for reachability problems that mitigate the increased computational scaling due to the extended state. As a result, we are able to compute continuous value functions for the ergodic exploration problem and provide performance guarantees for coverage under disturbances. Simulated and experimental results demonstrate the efficacy of our approach to generate robust ergodic trajectories for search and exploration with external disturbance force.

Time Optimal Ergodic Search

Robots with the ability to balance time against the thoroughness of search have the potential to provide time-critical assistance in applications such as search and rescue. Current advances in ergodic coverage-based search methods have enabled robots to completely explore and search an area in a fixed amount of time. However, optimizing time against the quality of autonomous ergodic search has yet to be demonstrated. In this paper, we investigate solutions to the time-optimal ergodic search problem for fast and adaptive robotic search and exploration. We pose the problem as a minimum time problem with an ergodic inequality constraint whose upper bound regulates and balances the granularity of search against time. Solutions to the problem are presented analytically using Pontryagin's conditions of optimality and demonstrated numerically through a direct transcription optimization approach. We show the efficacy of the approach in generating time-optimal ergodic search trajectories in simulation and with drone experiments in a cluttered environment. Obstacle avoidance is shown to be readily integrated into our formulation, and we perform ablation studies that investigate parameter dependence on optimized time and trajectory sensitivity for search.