航路安全归并问题中船舶秩序的维护

Pub Date : 2022-09-01 DOI:10.35634/vm220306
A. A. Spiridonov, S. Kumkov
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引用次数: 0

摘要

当前,如何制定一个最优安全的航班到达检查点的时间表,是空中交通管理的一个重要问题。如果相邻到达合并点之间存在安全间隔,则表示生成队列的安全性。通过改变飞机的速度和/或使用航线方案的碎片来改变飞机的到达时间,从而延长或缩短飞机的路径。队列被认为是最优的合成的一些额外要求:最小化偏差的实际飞机到达即时的名义,最小化订单合成队列的变化与原来相比,燃料支出最小化等。要最小化的最优性准则反映了这些要求,通常被认为是指定到达时间与名义到达时间偏差的惩罚总和。在几乎所有的论文中,每个单独的惩罚都被认为是指定到达时间与名义到达时间之差的绝对值,或者是非对称分支的类似函数(以不同的方式惩罚飞机的延误和加速)。该问题可分为两个子问题:一个是在生成的队列中搜索飞机的最优顺序,另一个是在给定顺序下搜索飞机的最优到达时间。第二个问题非常简单,因为它可以在线性规划的框架中形式化并且非常有效地解决。然而,第一个问题是非常困难的,现在有各种方法来解决。给出了该问题的充分条件,保证最优分配时刻的阶数与标称时刻的阶数相同,从而排除了第一个子问题。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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Keeping order of vessels in problem of safe merging aircraft flows
Nowadays, the problem of creating an optimal safe schedule for arrival of aircraft coming in several flows to a checkpoint, where these flows join into one, is very important for air-traffic management. Safety of the resultant queue is present if there is a safe interval between neighbor arrivals to the merge point. Change of an arrival instant of an aircraft is provided by changing its velocity and/or usage of fragments of the air-routes scheme, which elongate or shorten the aircraft path. Optimality of the resultant queue is considered from the point of some additional demands: minimization of the deviation of the actual aircraft arrival instant from the nominal one, minimization of order changes in the resultant queue in comparison with the original one, minimization of fuel expenditures, etc. The optimality criterion to be minimized, which reflects these demands, is often taken as a sum of penalties for deviations of the assigned arrival instants from the nominal ones. Each individual penalty is considered in almost all papers as either the absolute value of the difference between the assigned and nominal arrival instants or a similar function with asymmetric branches (which punishes delays and accelerations of an aircraft in different ways). The problem can be divided into two subproblems: one is a search for an optimal order of aircraft in the resultant queue, and the other is a search for optimal arrival instants for a given order. The second problem is quite simple since it can be formalized in the framework of linear programming and solved quite efficiently. However, the first one is very difficult and now is solved by various methods. The paper suggests sufficient conditions for the problem, which guarantee that the order of the optimal assigned instants is the same as the order of the nominal ones and, therefore, exclude the first subproblem.
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