Pursuit and Evasion Games for an Infinite System of Differential Equations

被引：0

作者：

Gafurjan Ibragimov

Massimiliano Ferrara

Idham Arif Alias

Mehdi Salimi

Nurzeehan Ismail

机构：

[1] Universiti Putra Malaysia,Department of Mathematics and Institute for Mathematical Research

[2] University Mediterranea of Reggio Calabria,Department of Law, Economics and Human Sciences

[3] University Mediterranea of Reggio Calabria,Department of Law, Economics and Human Sciences and Decisions Lab

[4] ICRIOS - The Invernizzi Centre for Research in Innovation,Department of Management and Technology

[5] Organization,Department of Mathematics & Statistics

[6] Strategy and Entrepreneurship Bocconi University,undefined

[7] St.Francis Xavier University,undefined

来源：

Bulletin of the Malaysian Mathematical Sciences Society | 2022年 / 45卷

关键词：

Differential game; Pursuit; Control; Strategy; Infinite system of differential equations; Primary: 91A23; Secondary: 49N75;

D O I：

暂无

中图分类号：

学科分类号：

摘要：

In this paper we study a linear pursuit differential game described by an infinite system of first-order differential equations in Hilbert space. The control functions of players are subject to geometric constraints. The pursuer attempts to bring the state of system from a given initial state to the origin for a finite time and the evader’s purpose is opposite. We obtain a formula for the guaranteed pursuit time and construct a strategy for pursuer. Also, we obtain a formula for the guaranteed evasion time.

引用

页码：69 / 81

页数：12

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