Unbounded Control, Infimum Gaps, and Higher Order Normality
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Publication:5081088
DOI10.1137/21M1431692zbMath1490.49016OpenAlexW4281571219MaRDI QIDQ5081088
Michele Palladino, Franco Rampazzo, Monica Motta
Publication date: 1 June 2022
Published in: SIAM Journal on Control and Optimization (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1137/21m1431692
Nonlinear systems in control theory (93C10) Optimality conditions for problems involving ordinary differential equations (49K15) Impulsive optimal control problems (49N25)
Cites Work
- When are minimizing controls also minimizing relaxed controls?
- Geometric optimal control. Theory, methods and examples
- \(\mathcal{L}^1\) limit solutions for control systems
- Pontryagin's maximum principle for constrained impulsive control problems
- Controllability, extremality, and abnormality in nonsmooth optimal control
- Extremality, controllability, and abundant subsets of generalized control systems
- Space-time trajectories of nonlinear systems driven by ordinary and impulsive controls
- Iterated Lie brackets for nonsmooth vector fields
- On \(\mathcal L^1\) limit solutions in impulsive control
- Control theory from the geometric viewpoint.
- Normality and nondegeneracy of the maximum principle in optimal impulsive control under state constraints
- No infimum gap and normality in optimal impulsive control under state constraints
- Gap phenomena and controllability in free end-time problems with active state constraints
- A geometrically based criterion to avoid infimum gaps in optimal control
- Fréchet generalized trajectories and minimizers for variational problems of low coercivity
- Minimizers That Are Not Also Relaxed Minimizers
- Minimum-time strong optimality of a singular arc: The multi-input non involutive case
- Optimization and Controllability without Differentiability Assumptions
- The High Order Maximal Principle and Its Application to Singular Extremals
- Needle Variations that Cannot be Summed
- Nondegenerate Abnormality, Controllability, and Gap Phenomena in Optimal Control with State Constraints
- A Higher-Order Maximum Principle for Impulsive Optimal Control Problems
- On the properness of an impulsive control extension of dynamic optimization problems
- Normality and gap phenomena in optimal unbounded control
- Normal control problems have no minimizing strictly original solutions
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