We show that mean field optimal controls satisfy a first order optimality condition (at a.e. time) without any a priori requirement on their spatial regularity. This principle is obtained by a careful limit procedure of the Pontryagin maximum principle for finite particle systems. In particular, our result applies to the case of mean field selective optimal control problems for multipopulation and replicator dynamics.
Mean field first order optimality condition under low regularity of controls / Almi, Stefano; Durastanti, Riccardo; Solombrino, Francesco. - (2025).
Mean field first order optimality condition under low regularity of controls
Stefano Almi;Riccardo Durastanti
;Francesco Solombrino
2025
Abstract
We show that mean field optimal controls satisfy a first order optimality condition (at a.e. time) without any a priori requirement on their spatial regularity. This principle is obtained by a careful limit procedure of the Pontryagin maximum principle for finite particle systems. In particular, our result applies to the case of mean field selective optimal control problems for multipopulation and replicator dynamics.File in questo prodotto:
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