Teglio, Andrea and Catalano, Michele and Petrovic, Marko (2014): Myopic households on a stable path: the neoclassical growth model with rule-based expectations.
Preview |
PDF
MPRA_paper_120253.pdf Download (1MB) | Preview |
Abstract
The neoclassical growth model is extended to include limitations in the forecasting capability of a rational individual, who can predict the future state of the economy only for a short time horizon. Long-term predictions are formulated according to uninformed expectations, relying solely on myopic information about short-run dynamics, such as assuming a future persistent growth rate. Steady-state results are obtained in the case of iso-elastic utility and Cobb-Douglas technology. The model, characterized by forecasting errors and subsequent corrections, exhibits global stability and has relevant implications for welfare and policy. It is analyzed in comparison to the Solow–Swan model and the Ramsey model. Our approach, incorporating behavioral assumptions within a standard optimization rule, successfully yields explicit analytical solutions for the policy function in the neoclassical model. This strategy may also be extended to various modeling streams, including DSGE and HANK models.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Myopic households on a stable path: the neoclassical growth model with rule-based expectations |
| Language: | English |
| Keywords: | Expectations, Neoclassical growth, Bounded rationality, Myopic behavior, Dynamic optimization, Time inconsistency. |
| Subjects: | C - Mathematical and Quantitative Methods > C6 - Mathematical Methods ; Programming Models ; Mathematical and Simulation Modeling > C61 - Optimization Techniques ; Programming Models ; Dynamic Analysis D - Microeconomics > D8 - Information, Knowledge, and Uncertainty > D83 - Search ; Learning ; Information and Knowledge ; Communication ; Belief ; Unawareness D - Microeconomics > D8 - Information, Knowledge, and Uncertainty > D84 - Expectations ; Speculations E - Macroeconomics and Monetary Economics > E2 - Consumption, Saving, Production, Investment, Labor Markets, and Informal Economy > E21 - Consumption ; Saving ; Wealth E - Macroeconomics and Monetary Economics > E2 - Consumption, Saving, Production, Investment, Labor Markets, and Informal Economy > E25 - Aggregate Factor Income Distribution |
| Item ID: | 120253 |
| Depositing User: | Dr. Andrea Teglio |
| Date Deposited: | 28 Feb 2024 03:02 |
| Last Modified: | 28 Feb 2024 03:02 |
| References: | Barro, R. J. (1999). Ramsey meets Laibson in the neoclassical growth model. The Quarterly Journal of Economics, 114(4), 1125–1152. Barro, R. J., & Sala-i-Martin, X. (2003). Economic Growth, 2nd Edition (Vol. 1). The MIT Press. Bellino, E. (2013). On the stability of the ramsey accumulation path. In E. S. Levrero, A. Palumbo, & A. Stirati (Eds.), Sraffa and the reconstruction of economic theory: Volume one: Theories of value and distribution (pp. 70– 04). Palgrave Macmillan UK. Campbell, S. D., & Sharpe, S. A. (2009). Anchoring bias in consensus forecasts and its effect on market prices. Journal of Financial and Quantitative Analysis, 44(2), 369–390. Cass, D. (1966). Optimum growth in an aggregative model of capital accumulation: A turnpike theorem. Econometrica, 34(4), 833–850. Dawid, H. (2005). Long horizon versus short horizon planning in dynamic optimization problems with incomplete information. Economic Theory, 25(3), 575–597. Day, R. H. (1992). Complex economic dynamics: Obvious in history, generic in theory, elusive in data. Journal of Applied Econometrics, 7, S9–S23. Day, R. H. (2000). Complex Economic Dynamics - Vol. 2: An Introduction to Macroeconomic Dynamics (Vol. 2). The MIT Press. Eusepi, S., & Preston, B. (2011). Expectations, learning, and business cycle fluctuations. American Economic Review, 101(6), 2844–2872. Evans, G. W., & Honkapohja, S. (2001). Learning and expectations in macroeconomics. Princeton University Press. Foellmi, R., Rosenblatt-Wisch, R., & Schenk-Hoppé, K. R. (2011). Consumption paths under prospect utility in an optimal growth model. Journal of Economic Dynamics and Control, 35(3), 273–281. Furnham, A., & Boo, H. C. (2011). A literature review of the anchoring effect. The Journal of Socio-Economics, 40(1), 35–42. Goldman, S. M. (1980). Consistent plans. The Review of Economic Studies, 47(3), 533. Jang, T.-S., & Sacht, S. (2022). Macroeconomic dynamics under bounded rationality: on the impact of consumers’ forecast heuristics. Journal of Economic Interaction and Coordination, 17(3), 849–873. King, R., & Rebelo, S. (1993). Transitional dynamics and economic growth in the neoclassical model. American Economic Review, 83(4), 908–31. Koopmans, T. C. (1960). Stationary ordinal utility and impatience. Econometrica, 28(2), 287–309. Kremer, M., Rao, G., & Schilbach, F. (2019). Chapter 5 - behavioral development economics. In B. D. Bernheim, S. DellaVigna, & D. Laibson (Eds.), Handbook of behavioral economics - foundations and applications 2 (pp. 345– 458). North-Holland. Kydland, F. E., & Prescott, E. C. (1982). Time to build and aggregate fluctuations. Econometrica, 50(6), 1345–1370. McFadden, D. (1999). Rationality for economists? Journal of Risk and Uncertainty, 19, 73–105. Pollak, R. A. (1968). Consistent planning. The Review of Economic Studies, 35(2), 201. Ramsey, F. P. (1928). A Mathematical Theory of Saving. The Economic Journal, 38(152), 543–559. Strotz, R. H. (1955). Myopia and inconsistency in dynamic utility maximization. The Review of Economic Studies, 23(3), 165. Tversky, A., & Kahneman, D. (1974). Judgment under uncertainty: Heuristics and biases. Science, 185(4157), 1124–1131. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/120253 |
All papers reproduced by permission. Reproduction and distribution subject to the approval of the copyright owners.
 |
View Item |
