Frameworks of Analysis

 

Galor Oded, "A Two-Sector Overlapping-Generations Model: A characterization of the Dynamical System," Econometrica, 60, 351-386, (November, 1992).

Galor Oded and Harl E. Ryder, "Existence, Uniqueness and Stability of Equilibrium in an Overlapping-Generations Model with Productive Capital," Journal of Economic Theory, 49, 360-375, (December 1989).

 

In recent decades the one-sector growth model and the one sector overlapping-generations model have become the standard frameworks for the analysis of dynamic economic phenomena. These frameworks generated novel insights in the understanding of aggregate economic behavior, while maintaining simplicity and analytical tractability. A similar level of interest has not experienced by dynamic two-sector models, despite the fact that modeling of a wide range of issues concerning growth, trade, sectional adjustments, etc., necessitates the employment of multi-sector dynamic models. This lack of broad interest could have been attributed in part to the absence of a two-sector overlapping-generations model. Unlike the development of the one sector overlapping-generations model (Diamond, 1965) that has complemented the one sector growth model, there has been no parallel development of a comprehensive overlapping-generations counterpart to the two-sector model (Uzawa, 1964).

Galor (1992) develops a two-sector overlapping-generations model, characterizing the dynamical system globally and establishing sufficient conditions for global uniqueness of perfect-foresight equilibrium path. Despite the global uniqueness of a perfect-foresight equilibrium path, the dynamical system may be characterized by multiple non-trivial steady-state equilibria. Thus, the paper provides (a) an analytically tractable framework for global dynamic analysis of phenomena whose modeling necessitates a the presence of several goods, and (b) an additional framework in which the implications of multiple steady-states can be examined, without being subjected to the conceptual difficulties associated with indeterminacy of dynamic equilibria and without the introduction of non-convexities or externalities.

Galor-Ryder (1989) analyzes the existence uniqueness and stability of perfect foresight equilibria in a one-sector overlapping-generations model. In addition it establishes the viability of multiple-steady-state equilibria in this conventional (convex) framework of analysis. Hence, the study provides a framework in which the implications of multiple steady states can be examined, without being subjected to the conceptual difficulties associated with indeterminacy of dynamic equilibria and without the introduction of non-convexities or externalities.