MAXIMUM PRINCIPLE FOR AGE AND DURATION STRUCTURED SYSTEMS: A TOOL FOR OPTIMAL PREVENTION AND TREATMENT OF HIV
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Publication:3155251
DOI10.1080/08898480490422301zbMath1053.92039OpenAlexW2091755795WikidataQ58296857 ScholiaQ58296857MaRDI QIDQ3155251
Tsvetomir Tsachev, Vladimir M. Veliov, Gustav Feichtinger
Publication date: 14 January 2005
Published in: Mathematical Population Studies (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/08898480490422301
population dynamicsPontryagin's maximum principleinfectious diseasesMcKendrick equationage-structured systems
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Cites Work
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- Optimal control of a nonlinear population dynamics with diffusion
- Optimal birth control of population dynamics
- Pontryagin's principle for control problems in age-dependent population dynamics
- Optimal ages of vaccination for measles
- Necessary conditions for infinite-dimensional control problems
- An age dependent epidemic model
- Optimal control of population dynamics
- Optimality conditions for age-structured control systems.
- Optimal vaccination patterns in age-structured populations: endemic case.
- Optimal birth control of population dynamics. II: Problems with free final time, phase constraints, and mini-max costs
- A unified theory of necessary conditions for nonlinear nonconvex control systems
- On State Constraint Representations and Mesh-Dependent Gradient Projection Convergence Rates for Optimal Control Problems
- Uniform Convergence and Mesh Independence of Newton's Method for Discretized Variational Problems
- A Mesh-Independence Principle for Operator Equations and Their Discretizations
- Optimal Vaccination Patterns in Age-Structured Populations
- How May Infection-Age-Dependent Infectivity Affect the Dynamics of HIV/AIDS?
- Second-Order Runge--Kutta Approximations in Control Constrained Optimal Control
- Dynamic optimization and Skiba sets in economic examples
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