Kaizoji, Taisei (2010): Multiple equilibria and chaos in a discrete tâtonnement process.
Preview |
PDF
MPRA_paper_24002.pdf Download (138kB) | Preview |
Abstract
The purpose of this note is to demonstrate a sufficient condition for discrete tâtonnement process to lead to chaos in a general equilibrium model with multiple commodities. The result indicates that as the speed of price adjustment increases the discrete tâtonnement process is complex in a general equilibrium economy in which there are multiple equilibria.
| Item Type: | MPRA Paper |
|---|---|
| Original Title: | Multiple equilibria and chaos in a discrete tâtonnement process |
| Language: | English |
| Keywords: | Multiple equilibria, Tâtonnement process; Nonlinear dynamics; Chaos |
| Subjects: | D - Microeconomics > D5 - General Equilibrium and Disequilibrium > D50 - General B - History of Economic Thought, Methodology, and Heterodox Approaches > B2 - History of Economic Thought since 1925 > B21 - Microeconomics C - Mathematical and Quantitative Methods > C0 - General > C02 - Mathematical Methods |
| Item ID: | 24002 |
| Depositing User: | Taisei KAIZOJI |
| Date Deposited: | 20 Jul 2010 13:39 |
| Last Modified: | 28 Sep 2019 05:21 |
| References: | Arrow, K.J., Hahn, F.H., 1971. General Competitive Analysis. North-Holland, Amsterdam. Arrow, .J., Hurwicz, L., 1958. On the stability of the competitive equilibrium, I. Econometrica 26, 522–552. Bala, V., Majumdar, M.,1992. Chaotictˆatonnement. Economic Theory2(4),437–445. Day, R.H., Pianigiani, G., 1991. Statistical dynamics and economics. Journal of Economic Behavior and Organization16 (1–2), 37–84. Day, R.H., 1994. Complex Economic Dynamics, MIT Press, Cambridge MA. Debreu, G.,1972. Smooth preferences. Econometrica 40 (4), 603–615. Dierker, E., "Two Remarks on the Number of Equilibria of an Economy," Econometrica, 40, (September, 1972), 951-953. Goeree, .K., Hommes, C., Weddepohl, C., 1998. Stability and complex dynamics in a discrete tâtonnement model. Journal of Economic Behavior and Organization 33(3), 395–410. Hatta, M., 1982. Euler’s Finite Difference scheme and chaos in . Proceedings of the Japan Academy, 58 Ser. A, (5) 178-181. Kaizouji, T., (1994) Multiple equilibria and chaotic Tatonnement: Applications of the Yamaguti-Matano theorem, Journal of Economic Behavior and Organization 24, 357–362. Mukherji, A.,1999. A simple example of complex dynamics. Economic Theory 14, 741–749. Negishi, T., 1958, A Note on the stability of an economy where all goods are gross substitutes, Econometrica 26, 445-447. Saari, D.G.,1985. Iterative price mechanisms. Econometrica 53 (5), 1117–1132. Tuinstra, J., 2000. A discrete and symmetric price adjustment process on the simplex. Journal of Economic Dynamics and Control 24 (5–7), 881–907. Varian, H., "A Third Remark on the Number of Equilibria of an Economy," Econometrica, 43, (September, 1975), 985-986. Weddepohl, C., 1995. A cautious price adjustment mechanism: chaotic behavior, Journal of Economic Behavior and Organization 27, 293-300. Yamaguti, M. and H. Matano, 1979, Euler’s finite difference scheme and chaos, Proceedings of Japan Academy 55, Series A, 78-80. |
| URI: | https://mpra.ub.uni-muenchen.de/id/eprint/24002 |
Available Versions of this Item
- Multiple equilibria and chaos in a discrete tâtonnement process. (deposited 20 Jul 2010 13:39) [Currently Displayed]
All papers reproduced by permission. Reproduction and distribution subject to the approval of the copyright owners.
 |
View Item |
