Grandmont (1985) found that the parameter space of the most classical dynamic models are stratified into an infinite number of subsets supporting an infinite number of different kinds of dynamics, from monotonic stability at one extreme to chaos at the other extreme, and with many forms of multiperiodic dynamics between. The econometric implications of Grandmont’s findings are particularly important, if bifurcation boundaries cross the confidence regions surrounding parameter estimates in policy-relevant models. Stratification of a confidence region into bifurcated subsets seriously damages robustness of dynamical inferences. Recently, interest in policy in some circles has moved to New Keynesian models. As a result, in this paper we ex...
In a recent paper, we studied bifurcation phenomena in continuous time macroeconometric models. The ...
Abstract My dissertation consists of three papers on bifurcation and market game models. My research...
Bifurcation, Dynamic general equilibrium, Hopf bifurcation, Flip bifurcation, Period doubling bifurc...
Grandmont (1985) found that the parameter space of the most classical dynamic models are stratified ...
As is well known in systems theory, the parameter space of most dynamic models is stratified into su...
Grandmont (1985) found that the parameter space of the most classical dynamic general-equilibrium ma...
In systems theory, it is well known that the parameter spaces of dynamical systems are stratified in...
Abstract: Grandmont (1985) found that the parameter space of the most classical dynamic general-equi...
Grandmont (1985) found that the parameter space of the most classical dynamic general-equilibrium ma...
We explore bifurcation phenomena in the open-economy New Keynesian model developed by Clarida, Gali ...
simplest, most classical models are stratified into bifurcation regions. But by demonstrating that f...
We explore bifurcation phenomena in the open-economy New Keynesian model developed by Gali and Monac...
We explore bifurcation phenomena in the open-economy New Keynesian model developed by Clarida, Gali ...
The Marshallian Macroeconomic Model in Zellner and Israilevich (2005) provides a novel way to examin...
Euler equation models represent an important class of macroeconomic systems. Our research on the Lee...
In a recent paper, we studied bifurcation phenomena in continuous time macroeconometric models. The ...
Abstract My dissertation consists of three papers on bifurcation and market game models. My research...
Bifurcation, Dynamic general equilibrium, Hopf bifurcation, Flip bifurcation, Period doubling bifurc...
Grandmont (1985) found that the parameter space of the most classical dynamic models are stratified ...
As is well known in systems theory, the parameter space of most dynamic models is stratified into su...
Grandmont (1985) found that the parameter space of the most classical dynamic general-equilibrium ma...
In systems theory, it is well known that the parameter spaces of dynamical systems are stratified in...
Abstract: Grandmont (1985) found that the parameter space of the most classical dynamic general-equi...
Grandmont (1985) found that the parameter space of the most classical dynamic general-equilibrium ma...
We explore bifurcation phenomena in the open-economy New Keynesian model developed by Clarida, Gali ...
simplest, most classical models are stratified into bifurcation regions. But by demonstrating that f...
We explore bifurcation phenomena in the open-economy New Keynesian model developed by Gali and Monac...
We explore bifurcation phenomena in the open-economy New Keynesian model developed by Clarida, Gali ...
The Marshallian Macroeconomic Model in Zellner and Israilevich (2005) provides a novel way to examin...
Euler equation models represent an important class of macroeconomic systems. Our research on the Lee...
In a recent paper, we studied bifurcation phenomena in continuous time macroeconometric models. The ...
Abstract My dissertation consists of three papers on bifurcation and market game models. My research...
Bifurcation, Dynamic general equilibrium, Hopf bifurcation, Flip bifurcation, Period doubling bifurc...