In this paper, we study the minimum distance constraint sweep coverage problem (MinSDCSC), the goal of which is to find the minimum number of mobile sensors and their trajectories such that each static sensor is visited at least once by some mobile sensor every required time interval and every mobile sensor visits a base station before running out of its energy (suppose every replenishment of energy can support a continuous movement of distance D). For the case when there is only one base station, we present an asymptotically -2-approximation algorithm for the problem on a graph with a metric distance function, and a 2-approximation algorithm for the problem on a tree metric, where is the approximation ratio for the traveling salesman problem and is the ratio between D and the distance from the base station to the farthest static sensor. For the case where there are k base stations, we show that there exists an algorithm with approximation factor at most k where is the approximation ratio for the problem with one base station.

• 出版日期2019-5
• 单位浙江师范大学