离散连续自由飞行轨迹优化的误差界

Error Bounds for Discrete-Continuous Free Flight Trajectory Optimization

Journal of Optimization Theory and Applications · 2023
被引 2
ABS 3

中文导读

研究了在空间图中用离散最短路径启动局部最小化来解决连续最短路径问题的方法,推导了飞行时间误差界,帮助设计最优图密度和连接结构。

Abstract

Abstract Two-stage methods addressing continuous shortest path problems start local minimization from discrete shortest paths in a spatial graph. The convergence of such hybrid methods to global minimizers hinges on the discretization error induced by restricting the discrete global optimization to the graph, with corresponding implications on choosing an appropriate graph density. A prime example is flight planning, i.e., the computation of optimal routes in view of flight time and fuel consumption under given weather conditions. Highly efficient discrete shortest path algorithms exist and can be used directly for computing starting points for locally convergent optimal control methods. We derive a priori and localized error bounds for the flight time of discrete paths relative to the optimal continuous trajectory, in terms of the graph density and the given wind field. These bounds allow designing graphs with an optimal local connectivity structure. The properties of the bounds are illustrated on a set of benchmark problems. It turns out that localization improves the error bound by four orders of magnitude, but still leaves ample opportunities for tighter error bounds by a posteriori estimators.

飞行规划最短路径问题离散优化最优控制