基于 Riccati 的 SPDE SLQ 问题离散化的收敛率

IF 2.3 2区数学 Q1 MATHEMATICS, APPLIED

IMA Journal of Numerical Analysis Pub Date : 2024-01-19 DOI:10.1093/imanum/drad097

Andreas Prohl, Yanqing Wang

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引用次数: 0

摘要

我们考虑在空间（参数 $h>0$）和时间（参数 $\tau>0$）上对随机最优控制问题进行新的离散化。其构造基于对广义差分里卡提方程的扰动，以近似相关反馈定律。我们证明了其解的收敛速率几乎为 ${\mathcal O}(h^{2}+\tau )$，并由此得出结论，对于具有加法噪声或乘法噪声的最优状态和控制的可计算近似值，收敛速率几乎为 ${\mathcal O}(h^{2}+\tau )$ resp.

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Convergence with rates for a Riccati-based discretization of SLQ problems with SPDEs

We consider a new discretization in space (parameter $h>0$) and time (parameter $\tau>0$) of a stochastic optimal control problem, where a quadratic functional is minimized subject to a linear stochastic heat equation with linear noise. Its construction is based on the perturbation of a generalized difference Riccati equation to approximate the related feedback law. We prove a convergence rate of almost ${\mathcal O}(h^{2}+\tau )$ for its solution, and conclude from it a rate of almost ${\mathcal O}(h^{2}+\tau )$ resp. ${\mathcal O}(h^{2}+\tau ^{1/2})$ for computable approximations of the optimal state and control with additive resp. multiplicative noise.

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来源期刊

IMA Journal of Numerical Analysis 数学-应用数学

CiteScore

5.30

自引率

4.80%

发文量

审稿时长

6-12 weeks

期刊介绍： The IMA Journal of Numerical Analysis (IMAJNA) publishes original contributions to all fields of numerical analysis; articles will be accepted which treat the theory, development or use of practical algorithms and interactions between these aspects. Occasional survey articles are also published.