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An Euler-Lagrange inclusion for optimal control problems - MaRDI portal

An Euler-Lagrange inclusion for optimal control problems

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DOI10.1109/9.400492zbMath0827.49014OpenAlexW2113258359MaRDI QIDQ4850248

Maria do Rosário de Pinho, Richard B. Vinter

Publication date: 17 December 1995

Published in: IEEE Transactions on Automatic Control (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1109/9.400492

zbMATH Keywords

optimality condition Euler-Lagrange equation endpoint constraints nonsmooth, nonlinear optimal control problems partial generalized gradients total generalized gradient weak form of the maximum principle

Mathematics Subject Classification ID

Optimality conditions for problems involving partial differential equations (49K20) Nonsmooth analysis (49J52)

Related Items (16)

Mixed constrained control problems ⋮ Variational optimality conditions with feedback descent controls that strengthen the maximum principle ⋮ A weak maximum principle for optimal control problems with nonsmooth mixed constraints ⋮ Remarks on necessary conditions for minimizers of one-dimensional variational problems ⋮ Weak maximum principle for optimal control problems with mixed constraints ⋮ Necessary optimality conditions for optimal control problems with nonsmooth mixed state and control constraints ⋮ Necessary conditions for optimal control problems involving nonlinear differential algebraic equations ⋮ The Pontryagin maximum principle and a unified theory of dynamic optimization ⋮ A maximum principle for optimal control problems with state and mixed constraints ⋮ Pontryagin maximum principle revisited with feedbacks ⋮ The optimal strategy for a bioeconomical model of a harvesting renewable resource problem. ⋮ Set separation, approximating multicones, and the Lipschitz maximum principle ⋮ Unmaximized inclusion necessary conditions for nonconvex constrained optimal control problems ⋮ Necessary Optimality Conditions for Optimal Control Problems with Equilibrium Constraints ⋮ Optimal Control Problems with Mixed and Pure State Constraints ⋮ Optimal Control with Nonregular Mixed Constraints: An Optimization Approach

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