Age-structured optimal control in population economics
From MaRDI portal
Publication:851395
DOI10.1016/j.tpb.2003.07.006zbMath1110.92035OpenAlexW2066855981WikidataQ58296852 ScholiaQ58296852MaRDI QIDQ851395
Alexia Prskawetz, Vladimir M. Veliov, Gustav Feichtinger
Publication date: 20 November 2006
Published in: Theoretical Population Biology (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.tpb.2003.07.006
Applications of optimal control and differential games (49N90) Population dynamics (general) (92D25) Mathematical geography and demography (91D20)
Related Items (9)
Optimal age-specific election policies in two-level organizations with fixed size ⋮ Optimal Forest Management in the Presence of Intraspecific Competition ⋮ An analysis of an optimal control problem for mosquito populations ⋮ Verification results for age-structured models of economic-epidemics dynamics ⋮ Gustav Feichtinger celebrates his 70th birthday ⋮ The application of an age-structured model to the north Aegean anchovy fishery: An evaluation of different management measures ⋮ The Rothe method for the Mckendrick-von Foerster equation ⋮ Using the Escalator Boxcar Train to Determine the Optimal Management of a Size-Distributed Forest When Carbon Sequestration Is Taken into Account ⋮ Straightened characteristics of McKendrick-von Foerster equation
Cites Work
- Unnamed Item
- Unnamed Item
- Pontryagin's principle for control problems in age-dependent population dynamics
- The McKendrick partial differential equation and its uses in epidemiology and population study
- Productivity slowdown due to scarcity of capital to scrap in a putty-clay model
- Strategic technology investment under uncertainty
- 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
- Optimal Time Paths with Age-Dependence: A Theory of Population Policy
- Second-Order Runge--Kutta Approximations in Control Constrained Optimal Control
- Optimal Control of Processes Described by Integral Equations. I
This page was built for publication: Age-structured optimal control in population economics
