Regularization and Propagation in a Hamilton–Jacobi–Bellman-Type Equation in Infinite-Dimensional Hilbert Space

Symmetry Pub Date : 2024-08-09 DOI:10.3390/sym16081017
Carlo Bianca, C. Dogbé
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Abstract

This paper is devoted to new propagation and regularity results for a class of first-order Hamilton–Jacobi–Bellman-type problems in a separable infinite-dimensional Hilbert space. Specifically, the related Cauchy problem is investigated by employing the Faedo–Galerkin approximation method. Under some structural assumptions, the main result is obtained by using the probabilistic representation formula of the solution in order to define the weak continuity assumptions, by assuming the existence of a symmetric positive definite Hilbert–Schmidt operator and by employing modulus continuity arguments.
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无穷维希尔伯特空间中汉密尔顿-雅各比-贝尔曼方程的正则化与传播
本文致力于研究可分离无限维希尔伯特空间中一类一阶汉密尔顿-雅各比-贝尔曼(Hamilton-Jacobi-Bellman)型问题的新传播和正则性结果。具体而言,本文采用 Faedo-Galerkin 近似方法研究了相关的 Cauchy 问题。在一些结构假设下,通过使用解的概率表示公式来定义弱连续性假设,通过假设对称正定希尔伯特-施密特算子的存在,以及通过使用模连续性论证,得到了主要结果。
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