Optimal Control of Investments in Old and New Capital Under Improving Technology

An optimal control problem for nonlinear integral equations of special kind is analyzed. It considers a firm’s investment into age-dependent capital under improving technology and limited substitutability among capital of different ages. We prove the existence of solutions and analyze their structure. It is shown that the initially bang-bang optimal investment switches to an interior one and eventually converges to a steady-state trajectory that represents balanced economic growth. The obtained analytic outcomes contribute to better understanding of investment policies under technological change.

[1]  Per Krusell,et al.  Long-Run Implications of Investment-Specific Technological Change , 1995 .

[2]  Natali Hritonenko,et al.  The optimal economic lifetime of vintage capital in the presence of operating costs, technological progress, and learning , 2008 .

[3]  A. Xepapadeas,et al.  Environmental Policy and Competitiveness: The Porter Hypothesis and the Composition of Capital , 1999 .

[4]  Boyan Jovanovic,et al.  Investment in vintage capital , 2012, J. Econ. Theory.

[5]  M Brokate,et al.  Pontryagin's principle for control problems in age-dependent population dynamics , 1985, Journal of mathematical biology.

[6]  Raouf Boucekkine,et al.  Optimal Investment in Heterogeneous Capital and Technology Under Restricted Natural Resource , 2014, J. Optim. Theory Appl..

[7]  N. Hritonenko,et al.  BANG-BANG, IMPULSE, AND SUSTAINABLE HARVESTING IN AGE-STRUCTURED POPULATIONS , 2012 .

[8]  N. Kato Optimal harvesting for nonlinear size-structured population dynamics , 2008 .

[9]  Morton E. Gurtin,et al.  On the optimal harvesting of age-structured populations: Some simple models☆ , 1981 .

[10]  Sebastian Aniţa,et al.  Analysis and Control of Age-Dependent Population Dynamics , 2010 .

[11]  Raouf Boucekkine,et al.  Replacement Echoes in the Vintage Capital Growth Model , 1997 .

[12]  Varadarajan V. Chari,et al.  Vintage Human Capital, Growth, and the Diffusion of New Technology , 1991, Journal of Political Economy.

[13]  Natali Hritonenko,et al.  Optimization of harvesting age in an integral age-dependent model of population dynamics. , 2005, Mathematical biosciences.

[14]  David Greenhalgh,et al.  Control of an epidemic spreading in a heterogeneously mixing population , 1986 .

[15]  Natali Hritonenko,et al.  Turnpike and Optimal Trajectories in Integral Dynamic Models with Endogenous Delay , 2005 .

[16]  Robert Hart,et al.  Growth, environment and innovation-a model with production vintages and environmentally oriented research , 2004 .

[17]  N. Hritonenko,et al.  Age-Structured PDEs in Economics, Ecology, and Demography: Optimal Control and Sustainability , 2010 .

[18]  Alfred J. Lotka,et al.  A Problem in Age-Distribution , 1911 .

[19]  Natali Hritonenko,et al.  Energy substitutability and modernization of energy-consuming technologies , 2012 .

[20]  H. Brezis Functional Analysis, Sobolev Spaces and Partial Differential Equations , 2010 .

[21]  Matthias Kredler Vintage Human Capital and Learning Curves , 2014 .

[22]  Mimmo Iannelli,et al.  Optimal Control of Population Dynamics , 1999 .

[23]  Size-structured plant population models and harvesting problems , 2007 .

[24]  Hector O. Fattorini,et al.  Infinite Dimensional Optimization and Control Theory: References , 1999 .

[25]  G. Webb Theory of Nonlinear Age-Dependent Population Dynamics , 1985 .