On the Properties of the Value Function Associated to a Mean-Field Optimal Control Problem of Bolza Type
Author(s) -
Benoit Bonnet,
Helene Frankowska
Publication year - 2022
Publication title -
2021 60th ieee conference on decision and control (cdc)
Language(s) - English
Resource type - Conference proceedings
eISSN - 2576-2370
ISBN - 978-1-6654-3659-5
DOI - 10.1109/cdc45484.2021.9683323
Subject(s) - aerospace , bioengineering , communication, networking and broadcast technologies , components, circuits, devices and systems , power, energy and industry applications , robotics and control systems , signal processing and analysis , transportation
In this paper, we obtain several structural results for the value function associated to a mean-field optimal control problem of Bolza type in the space of measures. After establishing the sensitivity relations bridging between the costates of the maximum principle and metric superdifferentials of the value function, we investigate semiconcavity properties of this latter with respect to both variables. We then characterise optimal trajectories using set-valued feedback mappings defined in terms of suitable directional derivatives of the value function.
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