Li, defu and Bental, Benjamin (2023): A Note on the Euler Equation of the Growth Model.
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Abstract
The neoclassical Euler equation provides the necessary conditions for households to maximize lifetime utility by allocating income between consumption and investment, and is the core equation for solving the steady-state of the neoclassical growth model. The existing textbooks (Barro and Sala-i-Martin, 2004, ch6.3; Acemoglu, 2009, ch13.2, ch15.6; Aghion and Howitt, 2009, ch3.2.2) ignore the premise of this equation and directly apply it to solve the steady state of other growth models, which not only leads to incorrect results but also limits the ability of growth models to analyze the steady-state technological progress direction. This note first points out and rigorously verifies the errors in existing textbooks; Then, by replacing the capital accumulation function with exogenous growth rate with the generalized capital accumulation function considering adjustment costs of investment in the Acemoglu (2009, ch15.6) model, the note put forward the generalized Euler equation and steady-state equilibrium including capital-augmenting technological progress, which reveals the necessary conditions for the neoclassical Euler equation and Uzawa’s (1961) steady-state theorem; Finally, it is pointed out that the possible reasons for the misuse of the neoclassical Euler equation in existing textbooks maybe confuse the rental price of capital and the interest rate of investment.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | A Note on the Euler Equation of the Growth Model |
| English Title: | A Note on the Euler Equation of the Growth Model |
| Language: | English |
| Keywords: | Neoclassical Euler equation, Uzawa’s steady-state theorem, Growth model, the direction of technical change,the rental price of capital, the interest rate of investment |
| Subjects: | E - Macroeconomics and Monetary Economics > E1 - General Aggregative Models > E13 - Neoclassical O - Economic Development, Innovation, Technological Change, and Growth > O3 - Innovation ; Research and Development ; Technological Change ; Intellectual Property Rights > O30 - General O - Economic Development, Innovation, Technological Change, and Growth > O4 - Economic Growth and Aggregate Productivity > O40 - General O - Economic Development, Innovation, Technological Change, and Growth > O4 - Economic Growth and Aggregate Productivity > O41 - One, Two, and Multisector Growth Models |
| Item ID: | 119048 |
| Depositing User: | Defu Li |
| Date Deposited: | 10 Nov 2023 07:33 |
| Last Modified: | 10 Nov 2023 07:33 |
| References: | Acemoglu, Daron, 2002, “Directed Technical Change”, Review of Economic Studies 69, pp. 781–809. Acemoglu, Daron, 2003, “Labor- and Capital-Augmenting Technical Change”, Journal of European Economic Association, Vol.1 (1), pp. 1-37. Acemoglu, Daron, 2009, Introduction to Modern Economic Growth, Princeton University Press, Princeton, New Jersey. Aghion, Philippe, and Peter Howitt, 2009, Cambridge, Mass.: MIT Press. Barro, Robert J. and Xavier Sala-i-Martin, 2004, Economic Growth. Cambridge, Mass.: MIT Press. Cass, David, 1965, “Optimum Growth in an Aggregate Model of Capital Accumulation.” Review of Economic Studies 32: 233–240. Irmen, Andreas, 2013, “Adjustment Costs in a Variant of Uzawa's Steady-state Growth Theorem”, Economics Bulletin, Vol. 33 No.4, pp. 2860-2873. Jones, Charles I., and Dean Scrimgeour, 2008, “A New Proof of Uzawa’s Steady-State Growth Theorem”, Review of Economics and Statistics, Vol. 90(1), pp. 180-182. Kaldor, N., 1961, “Capital Accumulation and Economic Growth”, in The Theory of Capital, ed. by F. A.Lutz, and D. C. Hague, pp. 177–222. Macmillan & Co. LTD., New York: St. Martin’s Press. Koopmans, Tjalling C., 1965, “On the Concept of Optimal Economic Growth.” In The Econometric Approach to Development Planning, Amsterdam: North-Holland, pp. 225–295. Li, Defu, 2016,“A Proof of the Invalidity of Proposition 15.12 in Acemoglu(2009)”, https://mpra.ub.uni-muenchen.de/75329/. Li, Defu and Benjamin Bental,2022, “What Determines the Direction of Technological Progress?”, Tongji University Working Paper. Peters, M. , & Simsek, A., 2010. Solutions manual for introduction to modern economic growth. Princeton University Press. Ramsey, Frank,1928. “A Mathematical Theory of Saving.” Economic Journal, 38, December, 543–559. Rivera-Batiz, L. A. and P. M. Romer, 1991, “Economic Integration and Endogenous Growth”, Quarterly Journal of Economics, 106, pp.531-555. Solow, Robert M., 1956, “A Contribution to the Theory of Economic Growth.” Quarterly Journal of Economics 70: 65–94. Uzawa, H., 1961, “Neutral Inventions and the Stability of Growth Equilibrium”, Review of Economic Studies, Vol. 28, February, pp. 117-124. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/119048 |
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