Sensitivity relations for the Mayer problem with differential inclusions

In optimal control, sensitivity relations are usually understood as inclusions that identify the pair formed by the dual arc and the Hamiltonian, evaluated along the associated minimizing trajectory, as a suitable generalized gradient of the value function. In this paper, sensitivity relations are obtained for the Mayer problem associated with the differential inclusion $\dot x\in F(x)$ and applied to derive optimality conditions. Our first application concerns the maximum principle and consists in showing that a dual arc can be constructed for {\em every} element of the superdifferential of the final cost. As our second application, with every nonzero limiting gradient of the value function at some point $(t,x)$ we associate a family of optimal trajectories at $(t,x)$ with the property that families corresponding to distinct limiting gradients have {\em empty} intersection.

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Field Value
Source https://hal.sorbonne-universite.fr/hal-00949021
Author Cannarsa, Piermarco, Frankowska, Hélène, Scarinci, Teresa
Maintainer CCSD
Last Updated May 6, 2026, 08:02 (UTC)
Created May 6, 2026, 08:02 (UTC)
Identifier hal-00949021
Language en
Rights https://about.hal.science/hal-authorisation-v1/
contributor Dipartimento di Matematica [Roma II] (DIPMAT) ; Università degli Studi di Roma Tor Vergata [Roma, Italia] = University of Rome Tor Vergata [Rome, Italy] = Université de Rome Tor Vergata [Rome, Italie]
creator Cannarsa, Piermarco
date 2014-02-10T00:00:00
harvest_object_id ca67bd08-28d2-432c-b2fe-6afd65dda55d
harvest_source_id 3374d638-d20b-4672-ba96-a23232d55657
harvest_source_title test moissonnage SELUNE
metadata_modified 2024-05-13T00:00:00
set_spec type:UNDEFINED