对偶(序理论)
补语(音乐)
对偶(语法数字)
数学优化
强对偶性
上下界
动态规划
计算机科学
启发式
线性规划
对偶间隙
随机规划
计算
数理经济学
数学
最优化问题
算法
离散数学
艺术
数学分析
生物化学
化学
文学类
互补
基因
表型
作者
David B. Brown,James E. Smith,Peng Sun
出处
期刊:Operations Research
[Institute for Operations Research and the Management Sciences]
日期:2010-04-10
卷期号:58 (4-part-1): 785-801
被引量:235
标识
DOI:10.1287/opre.1090.0796
摘要
We describe a general technique for determining upper bounds on maximal values (or lower bounds on minimal costs) in stochastic dynamic programs. In this approach, we relax the nonanticipativity constraints that require decisions to depend only on the information available at the time a decision is made and impose a “penalty” that punishes violations of nonanticipativity. In applications, the hope is that this relaxed version of the problem will be simpler to solve than the original dynamic program. The upper bounds provided by this dual approach complement lower bounds on values that may be found by simulating with heuristic policies. We describe the theory underlying this dual approach and establish weak duality, strong duality, and complementary slackness results that are analogous to the duality results of linear programming. We also study properties of good penalties. Finally, we demonstrate the use of this dual approach in an adaptive inventory control problem with an unknown and changing demand distribution and in valuing options with stochastic volatilities and interest rates. These are complex problems of significant practical interest that are quite difficult to solve to optimality. In these examples, our dual approach requires relatively little additional computation and leads to tight bounds on the optimal values.
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