A maximum principle for Markov regime-switching forward–backward stochastic differential games and applications

被引:0
作者
Olivier Menoukeu-Pamen
Romuald Hervé Momeya
机构
[1] African Institute for Mathematical Sciences Ghana,Institute for Financial and Actuarial Mathematics, Department of Mathematical
[2] University of Liverpool,undefined
[3] Peach Street,undefined
[4] CIBC Asset Management Inc.,undefined
来源
Mathematical Methods of Operations Research | 2017年 / 85卷
关键词
Forward–backward stochastic differential equations; Markov regime-switching; Stochastic differential games; Optimal investment; Stochastic maximum principle; IM00; IM50; 93E30; 91G80; 91G10; 60G51; 60HXX; 91B30;
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摘要
In this paper, we present an optimal control problem for stochastic differential games under Markov regime-switching forward–backward stochastic differential equations with jumps. First, we prove a sufficient maximum principle for nonzero-sum stochastic differential games problems and obtain equilibrium point for such games. Second, we prove an equivalent maximum principle for nonzero-sum stochastic differential games. The zero-sum stochastic differential games equivalent maximum principle is then obtained as a corollary. We apply the obtained results to study a problem of robust utility maximization under a relative entropy penalty and to find optimal investment of an insurance firm under model uncertainty.
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页码:349 / 388
页数:39
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