An interregional multisectoral model of economic growth with nonlinear production functions
Location Theory and Regional Models
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KeywordsEconomic Growth Production Function Nonlinear Production Multisectoral Model Nonlinear Production Function
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- 1.Examples of this work include: Walter Isard, “Interregional Linear Programming: an Elementary Presentation and General Model,”Journal of Regional Science, Vol. 1 (Summer 1958), pp. 1–59; Benjamin H. Stevens, “An Interregional Linear Programming Model,”Journal of Regional Science, Vol. 1 (Summer 1958), pp. 60–98; Leon N. Moses, “A General Equilibrium Model of Production, Interregional Trade and Location of Industry,”Review of Economics and Statistics, Vol. 42 (November 1960), pp. 373–397; Jan Tinbergen, “Multiregional and Multisectoral Dynamic Model of Outlays: Output for a Period of Medium Duration,” inProgramming Techniques for Economic Development (Bangkok: United Nations Economic Commission for Asia and the Far East, 1960); L.V. Kantorovich and V.L. Makarov, “Optimal Models of Perspective Planning,”Application of Mathematics in Economic Research (Moscow: Mysl Publishing House, 1965) Vol. 3 [in Russian]; V. A. Mash, “On the Problem of Perspective Optimal Economic Development in Sectoral and Territorial Plans,”Economics and Mathematical Methods, Vol. 1, No. 6 (1965) [in Russian].Google Scholar
- 2.V. F. Pugachev, “Approximation Scheme for Multistage Optimal Planning of the National Economy,”Methods of Mathematical Economics (Moscow: Nauka Publishing House, 1965) Vol. 2 [in Russian].Google Scholar
- 3.B. N. Mikhalevsky,Perspective Calculations on the Basis of Simple Dynamic Models (Moscow: Nauka Publishing House, 1964) [in Russian].Google Scholar
- 4.V. V. Kossov, “Concerning a Certain Scheme for the Optimal Planning of Regions,”Problems of Economics, No. 2 (1967) [in Russian].Google Scholar
- 5.See, for example, B. N. Mikhalevsky, “The Macroeconomic Production Function as a Model of Economic Growth,”Economics and Mathematical Methods, Vol. 3, No. 2 (1967) [in Russian].Google Scholar
© The Regional Science Association 1967