Linearization of a dynamic programming equation

被引：1

作者：

Lefebvre, M ^{[1
]}

机构：

[1] Ecole Polytech, Dept Math & Genie Ind, Montreal, PQ H3C 3A7, Canada

来源：

INTERNATIONAL JOURNAL OF SYSTEMS SCIENCE | 2000年 / 31卷 / 10期

关键词：

D O I：

10.1080/00207720050165816

中图分类号：

TP [自动化技术、计算机技术];

学科分类号：

0812 ;

摘要：

Let x(t) = (x(1)(t),x(2)(t)) be defined by the stochastic differential equations dx(i)(t) = a(i)[x(t)]dt + Sigma (2)(j=1) b(ij)[x(t)]u(j)(t)dt + c(i)(1/ 2)[x(t)]dW(i)(t), where W-i is a standard Brownian motion, for i = 1, 2. There are two optimizers. The first one, using u(1) (t), tries to minimize the expected value of a quadratic cost criterion J, while the second one, using u(2)(t), wants to maximize this expected value. The game ends the first time x(t) reaches a subset of IR2. It is shown that it is sometimes possible to linearize the dynamic programming equation that must be solved to obtain the optimal value of u(i)(t). Examples are solved explicitly.

引用

页码：1317 / 1322

页数：6

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