This paper contributes to the new keynesian literature by showing that stable endogenous cycles can emerge as equilibrium solutions of the traditional IS-LM model. The application of the original Bogdanov-Takens theorem allows us to determine the regions of the parametric space where the model exhibits a global indeterminate solution, and a low-growth trapping region, characterized by a continuum of equilibrium trajectories in the proximity of a homoclinic bifurcation
In this paper we prove analytically the existence of a homoclinic orbit in a well known modified ve...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
This paper analyzes, within its feasible parameter space, the dynamics of the Uzawa-Lucas endogenous...
This paper contributes to the new keynesian literature by showing that stable endogenous cycles can ...
In this paper we use global bifurcation theory as understand complicated stability phenomena of gene...
With the aim of better understanding the conditions which determine endogenous fluctuations at busin...
Using an explicit center manifold reduction in correspondence of a Bogdanov-Takens singularity, we a...
This paper explores the possibility of complex dynamics in a variant of the [29] model of endogenous...
This paper studies the dynamics implied by the Chamley (1993) model, a variant of the two-sector mo...
This paper shows that global indeterminacy may characterize the three-dimensional vector field impli...
This paper analyzes the dynamics of a variant of Jones (2002) semi-endogenous growth model within th...
AbstractWe analyze the global dynamics of the solutions of a general non-linear fixed-price disequil...
The subject of this thesis is the bifurcation analysis of dynamical systems (ordinary differential e...
Endogenous cycles in standard growth models with capital accumulation of the Solow or the OLG type o...
Using the Andronov-Hopf bifurcation theorem and the Poincaré-Bendixson Theorem, this paper explores ...
In this paper we prove analytically the existence of a homoclinic orbit in a well known modified ve...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
This paper analyzes, within its feasible parameter space, the dynamics of the Uzawa-Lucas endogenous...
This paper contributes to the new keynesian literature by showing that stable endogenous cycles can ...
In this paper we use global bifurcation theory as understand complicated stability phenomena of gene...
With the aim of better understanding the conditions which determine endogenous fluctuations at busin...
Using an explicit center manifold reduction in correspondence of a Bogdanov-Takens singularity, we a...
This paper explores the possibility of complex dynamics in a variant of the [29] model of endogenous...
This paper studies the dynamics implied by the Chamley (1993) model, a variant of the two-sector mo...
This paper shows that global indeterminacy may characterize the three-dimensional vector field impli...
This paper analyzes the dynamics of a variant of Jones (2002) semi-endogenous growth model within th...
AbstractWe analyze the global dynamics of the solutions of a general non-linear fixed-price disequil...
The subject of this thesis is the bifurcation analysis of dynamical systems (ordinary differential e...
Endogenous cycles in standard growth models with capital accumulation of the Solow or the OLG type o...
Using the Andronov-Hopf bifurcation theorem and the Poincaré-Bendixson Theorem, this paper explores ...
In this paper we prove analytically the existence of a homoclinic orbit in a well known modified ve...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
This paper analyzes, within its feasible parameter space, the dynamics of the Uzawa-Lucas endogenous...