This paper is a survey on the properties of Strong Metric Regularity (SMR) and Strong Metric subRegularity (SMsR) of mappings representing first order optimality conditions (optimality mappings) in infinite dimensional spaces, with a focus on optimal control problems.
The key highlights and insights are:
The authors introduce the definitions of SMsR and SMR, which involve two metrics either in the domain or in the image spaces. This extension is shown to be relevant in optimal control problems.
The paper presents abstract results on the stability of these regularity properties under perturbations, including the case of linearization.
For mathematical programming problems in Banach spaces, sufficient conditions are provided for the SMsR property of the optimality mapping associated with the Karush-Kuhn-Tucker system.
For Mayer-type optimal control problems for ODE systems, the authors establish the SMsR property of the optimality mapping under coercivity-type conditions.
For affine optimal control problems for ODE systems, the SMsR and SMR properties of the optimality mapping are investigated, without requiring the coercivity assumption.
The results highlight the importance of considering two norms, either in the domain or in the image spaces, to obtain the desired regularity properties of the optimality mappings in optimal control problems.
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arxiv.org
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by Nicolai A. J... ב- arxiv.org 10-01-2024
https://arxiv.org/pdf/2409.19452.pdfשאלות מעמיקות