Magnus integrators for solving linear-quadratic differential games

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摘要

We consider Magnus integrators to solve linear-quadratic N-player differential games. These problems require to solve, backward in time, non-autonomous matrix Riccati differential equations which are coupled with the linear differential equations for the dynamic state of the game, to be integrated forward in time. We analyze different Magnus integrators which can provide either analytical or numerical approximations to the equations. They can be considered as time-averaging methods and frequently are used as exponential integrators. We show that they preserve some of the most relevant qualitative properties of the solution for the matrix Riccati differential equations as well as for the remaining equations. The analytical approximations allow us to study the problem in terms of the parameters involved. Some numerical examples are also considered which show that exponential methods are, in general, superior to standard methods.

论文关键词:Differential games,Coupled Riccati differential equations,Exponential integrators

论文评审过程:Received 22 June 2010, Revised 23 December 2011, Available online 16 March 2012.

论文官网地址:https://doi.org/10.1016/j.cam.2012.03.008