避障
计算理论
运动规划
弹道
路径(计算)
障碍物
数学
最大值原理
继续
庞特里亚金最小原理
最优控制
控制理论(社会学)
避碰
算法
计算机科学
数学优化
移动机器人
控制(管理)
人工智能
机器人
物理
碰撞
天文
程序设计语言
法学
政治学
计算机安全
作者
Arturo De Marinis,Felice Iavernaro,Francesca Mazzia
出处
期刊:Numerical Algorithms
[Springer Science+Business Media]
日期:2021-10-12
卷期号:89 (4): 1639-1661
被引量:17
标识
DOI:10.1007/s11075-021-01167-w
摘要
Abstract In this article, we present a new strategy to determine an unmanned aerial vehicle trajectory that minimizes its flight time in presence of avoidance areas and obstacles. The method combines classical results from optimal control theory, i.e. the Euler-Lagrange Theorem and the Pontryagin Minimum Principle, with a continuation technique that dynamically adapts the solution curve to the presence of obstacles. We initially consider the two-dimensional path planning problem and then move to the three-dimensional one, and include numerical illustrations for both cases to show the efficiency of our approach.
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