Further results about L ∞ /L 1 duality and applications to the SIR epidemiological model - Département MathNum
Communication Dans Un Congrès Année : 2024

Further results about L ∞ /L 1 duality and applications to the SIR epidemiological model

Résumé

The L∞/L1 duality in optimal control problems consists in studying how to link solutions minimizing the L∞ norm of an output function under an upper L1 constraint on an input function (primal problem), with solutions minimizing the L1 norm of the input function under an upper L∞ constraint on the output function (dual problem). In this work, we bring insights on recent results on L∞/L1 duality in optimal control problems. In particular, we exhibit an example for which duality does not apply, and we revisit the application to the epidemiological SIR problem.

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Dates et versions

hal-04663533 , version 1 (28-07-2024)

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  • HAL Id : hal-04663533 , version 1

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Dan Goreac, Alain Rapaport. Further results about L ∞ /L 1 duality and applications to the SIR epidemiological model. 63rd IEEE Conference on Decision and Control (CDC 2024), IEEE Control Systems Society, Dec 2024, Milan, Italy. ⟨hal-04663533⟩
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