NONZERO-SUM DIFFERENTIAL GAME OF BACKWARD DOUBLY STOCHASTIC SYSTEMS WITH DELAY AND APPLICATIONS

被引：3

作者：

Zhu, Qingfeng ^{[1
,2
,3
,4
]}

Shi, Yufeng ^{[1
,2
]}

机构：

[1] Shandong Univ, Inst Financial Studies, Jinan 250100, Peoples R China

[2] Shandong Univ, Sch Math, Jinan 250100, Peoples R China

[3] Shandong Univ Finance & Econ, Sch Math & Quantitat Econ, Jinan 250014, Peoples R China

[4] Shandong Univ Finance & Econ, Shandong Key Lab Blockchain Finance, Jinan 250014, Peoples R China

来源：

MATHEMATICAL CONTROL AND RELATED FIELDS | 2021年 / 11卷 / 01期

基金：

中国国家自然科学基金; 国家重点研发计划;

关键词：

Nonzero-sum stochastic differential game; delayed backward doubly stochastic differential equations; anticipated doubly stochastic differential equations; linear-quadratic problem; Nash equilibrium point; MAXIMUM PRINCIPLE; EQUATIONS DRIVEN; SPDES; COEFFICIENTS; PDIES;

D O I：

10.3934/mcrf.2020028

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

This paper is concerned with a kind of nonzero-sum differential game of backward doubly stochastic system with delay, in which the state dynamics follows a delayed backward doubly stochastic differential equation (SDE). To deal with the above game problem, it is natural to involve the adjoint equation, which is a kind of anticipated forward doubly SDE. We give the existence and uniqueness of solutions to delayed backward doubly SDE and anticipated forward doubly SDE. We establish a necessary condition in the form of maximum principle with Pontryagin's type for open-loop Nash equilibrium point of this type of game, and then give a verification theorem which is a sufficient condition for Nash equilibrium point. The theoretical results are applied to study a nonzero-sum differential game of linear-quadratic backward doubly stochastic system with delay.

引用

页码：73 / 94

页数：22

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