Persistent Monitoring of Dynamically Changing Environments Using an Unmanned Vehicle

Abstract

We consider the problem of planning a closed walk W for a UAV to persistently monitor a finite number of stationary targets with equal priorities and dynamically changing properties. A UAV must physically visit the targets in order to monitor them and collect information therein. The frequency of monitoring any given target is specified by a target revisit time, i.e., the maximum allowable time between any two successive visits to the target. The problem considered in this paper is the following: Given n targets and k ≥ n allowed visits to them, find an optimal closed walk W*(k) so that every target is visited at least once and the maximum revisit time over all the targets, R( W(k)), is minimized. We prove the following: If k ≥ n2-n, R( W*(k)) (or simply, R*(k)) takes only two values: R*(n) when k is an integral multiple of n, and R*(n+1) otherwise. This result suggests significant computational savings - one only needs to determine W*(n) and W*(n+1) to construct an optimal solution W*(k). We provide MILP formulations for computing W*(n) and W*(n+1). Furthermore, for any given k, we prove that R*(k) ≥ R*(k+n).