To the problem of the pursuit in quasilinear differential lag games

IF 0.3 Q4 MATHEMATICS, INTERDISCIPLINARY APPLICATIONS

Vestnik Sankt-Peterburgskogo Universiteta Seriya 10 Prikladnaya Matematika Informatika Protsessy Upravleniya Pub Date : 2022-01-01 DOI:10.21638/11701/spbu10.2022.303

E. M. Mukhsinov

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引用次数: 0

Abstract

In the field of the theory of differential games defined in a finite-dimensional space, fundamental works were carried out by L. S. Pontryagin, N. N. Krasovskiy, B. N. Pshenichny, L. S. Petrosyan, M. S. Nikol’skiy, N. Yu. Satimov and others. L. S. Pontryagin and his students consider differential games separately, from the point of view of the pursuer and from the point of view of the evader, which inevitably connects the differential game with two different problems. In this paper, in a Hilbert space, we consider the pursuit problem in the sense of L. S. Pontryagin for a quasilinear differential game, when the dynamics of the game is described by a differential equation of retarded type with a closed linear operator generating a strongly continuous semigroup. Two main theorems on the solvability of the pursuit problem are proved. In the first theorem, a set of initial positions is found from which it is possible to complete the pursuit with a guaranteed pursuit time. The second theorem defines sufficient conditions on the optimality of the pursuit time. The results obtained generalize the results of works by P. B. Gusyatnikov, M. S. Nikol’skiy, E. M. Mukhsinov, and M. N. Murodova, in which it is described by a differential equation of retarded type in a Hilbert space. Our results make it possible to study delayed-type conflict-controlled systems not only with lumped, but also with distributed parameters.

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对拟线性微分时滞对策中的追逐问题进行了研究

在有限维空间微分对策理论方面，有L. S. Pontryagin、N. N. Krasovskiy、B. N. Pshenichny、L. S. Petrosyan、M. S. Nikol 'skiy、N. Yu等人进行了基础性工作。萨提莫夫和其他人。L. S. Pontryagin和他的学生分别从追求者和逃避者的角度考虑微分对策，这不可避免地将微分对策与两个不同的问题联系起来。本文在Hilbert空间中，考虑一类拟线性微分对策在L. S. Pontryagin意义上的追逐问题，当该对策的动力学用一个迟钝型微分方程描述，该微分方程具有一个闭线性算子生成一个强连续半群。证明了追逐问题可解性的两个主要定理。在第一个定理中，我们找到了一组初始位置，从这些位置出发，可以在保证跟踪时间的情况下完成跟踪。第二个定理定义了追捕时间最优性的充分条件。所得结果推广了P. B. Gusyatnikov, M. S. Nikol 'skiy, E. M. Mukhsinov, M. N. Murodova等人用Hilbert空间中迟滞型微分方程描述的研究结果。我们的研究结果使得研究集总参数和分布参数的延迟型冲突控制系统成为可能。

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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来源期刊

Vestnik Sankt-Peterburgskogo Universiteta Seriya 10 Prikladnaya Matematika Informatika Protsessy Upravleniya MATHEMATICS, INTERDISCIPLINARY APPLICATIONS-

CiteScore

1.30

自引率

50.00%

发文量

期刊介绍： The journal is the prime outlet for the findings of scientists from the Faculty of applied mathematics and control processes of St. Petersburg State University. It publishes original contributions in all areas of applied mathematics, computer science and control. Vestnik St. Petersburg University: Applied Mathematics. Computer Science. Control Processes features articles that cover the major areas of applied mathematics, computer science and control.