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DISCRETE CHOICE AND COMPLEX DYNAMICS IN DETERMINISTIC OPTIMIZATION PROBLEMS

Published online by Cambridge University Press:  13 February 2012

Takashi Kamihigashi
Takashi Kamihigashi*
Affiliation:
RIEB, Kobe University
*
Address correspondence to: Takashi Kamihigashi, RIEB, Kobe University, Rokkodai, Nada, Kobe 657-8501, Japan; e-mail: tkamihig@rieb.kobe-u.ac.jp.
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Abstract

This paper shows that complex dynamics arises naturally in deterministic discrete choice problems. In particular, it shows that if the objective function of a maximization problem can be written as a function of a sequence of discrete variables, and if the (maximized) value function is strictly increasing in an exogenous variable, then for almost all values of the exogenous variable, any optimal path exhibits aperiodic dynamics. This result is applied to a maximization problem with indivisible durable goods, as well as to a Ramsey model with an indivisible consumption good. In each model, it is shown that optimal dynamics is almost always complex. These results are illustrated with various numerical examples.

Keywords

Discrete ChoiceComplex DynamicsChaosIndivisible Goods
Type
Articles
Information
Macroeconomic Dynamics , Volume 16 , Supplement S1: Nonlinear Dynamics in Equilibrium Models , April 2012 , pp. 52 - 69
Copyright
Copyright © Cambridge University Press 2012

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References

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