通用分离向量引理在非光滑Mayer代价函数的最优采样数据控制问题中的应用

IF 1 4区数学 Q1 MATHEMATICS

Mathematical Control and Related Fields Pub Date : 2022-01-01 DOI:10.3934/mcrf.2022039

S. Adly, L. Bourdin, Gaurav Dhar

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引用次数: 1

摘要

本文给出了具有非光滑Mayer代价函数的最优采样数据控制问题的庞特里亚金极大值原理。我们的研究使我们首先考虑凸集分离的一般问题。精确地说，我们利用经典的范极小极大定理，建立了一个普适分离向量的存在性，该普适分离向量属于给定紧凸集的单子的一组分离向量的凸包络。这个所谓的通用分离向量引理与凸控制摄动包一起用于导出具有非光滑Mayer代价函数的最优采样数据控制问题的庞特里亚金极大原理。作为我们的主要结果的一个说明性应用，我们通过实现间接数值方法解决了一个简单的例子。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The application of a universal separating vector lemma to optimal sampled-data control problems with nonsmooth Mayer cost function

In this paper we provide a Pontryagin maximum principle for optimal sampled-data control problems with nonsmooth Mayer cost function. Our investigation leads us to consider, in a first place, a general issue on convex sets separation. Precisely, thanks to the classical Fan's minimax theorem, we establish the existence of a universal separating vector which belongs to the convex envelope of a given set of separating vectors of the singletons of a given compact convex set. This so-called universal separating vector lemma is used, together with packages of convex control perturbations, to derive a Pontryagin maximum principle for optimal sampled-data control problems with nonsmooth Mayer cost function. As an illustrative application of our main result we solve a simple example by implementing an indirect numerical method.

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来源期刊

Mathematical Control and Related Fields MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

2.50

自引率

8.30%

发文量

期刊介绍： MCRF aims to publish original research as well as expository papers on mathematical control theory and related fields. The goal is to provide a complete and reliable source of mathematical methods and results in this field. The journal will also accept papers from some related fields such as differential equations, functional analysis, probability theory and stochastic analysis, inverse problems, optimization, numerical computation, mathematical finance, information theory, game theory, system theory, etc., provided that they have some intrinsic connections with control theory.