In this paper we prove analytically the existence of a homoclinic orbit in a well known modified version of Romer's model, ( see Slobodyan S., 2006) a system with a single equilibrium point, and there the existence of chaos. More in detail, by the undetermined coefficient method, we analytically demonstrate that there exists a homoclinic orbit of a Shilnikov type that connects the single equilibrium point (see, Shang D., Han M., 2005). Furthermore, on the basis of the Shilnikov Theorem assumptions, we find that Smale horseshoe occurs both theoretically and numerically. The economic implications of this analysis are finally discussed. (see also Mattana P. and Venturi B., 1999; D. Fiaschi and S. Sordi , 2002; De Cesare L. and Sportelli M., 2...
Over the last decades, the ability of the intertemporal equilibrium theory to provide indications ab...
We consider a growth model proposed by Matsuyama [K. Matsuyama, Growing through cycles, Econometrica...
The paper investigates the dynamical properties of a resource optimal system derived by Wirl (2004) ...
In this paper we prove analytically the existence of a homoclinic orbit in a well known modified ve...
In this paper we prove the existence of a homoclinic orbit in the standard Lucas’ two-sector endogen...
The objective of this study is to prove analytically the existence of the homoclinic orbit in a modi...
This article is aimed at developing some results on the existence of chaotic behaviour and indetermi...
This paper shows that chaotic dynamics and global indeterminacy may characterize the Lucas(1988)endo...
Following Mulligan and Sala-i-Martin (1993) we study a general class of endogenous growth models for...
This paper explores the possibility of complex dynamics in a variant of the [29] model of endogenous...
This paper shows that global indeterminacy may characterize the three-dimensional vector field impli...
In this paper we use global bifurcation theory as understand complicated stability phenomena of gene...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
In this paper we investigate the dynamic properties of the Romer model. We determine the whole set o...
CHAOTIC SOLUTIONS IN THE LUCAS MODEL In this paper we show that the investigation of limit set ...
Over the last decades, the ability of the intertemporal equilibrium theory to provide indications ab...
We consider a growth model proposed by Matsuyama [K. Matsuyama, Growing through cycles, Econometrica...
The paper investigates the dynamical properties of a resource optimal system derived by Wirl (2004) ...
In this paper we prove analytically the existence of a homoclinic orbit in a well known modified ve...
In this paper we prove the existence of a homoclinic orbit in the standard Lucas’ two-sector endogen...
The objective of this study is to prove analytically the existence of the homoclinic orbit in a modi...
This article is aimed at developing some results on the existence of chaotic behaviour and indetermi...
This paper shows that chaotic dynamics and global indeterminacy may characterize the Lucas(1988)endo...
Following Mulligan and Sala-i-Martin (1993) we study a general class of endogenous growth models for...
This paper explores the possibility of complex dynamics in a variant of the [29] model of endogenous...
This paper shows that global indeterminacy may characterize the three-dimensional vector field impli...
In this paper we use global bifurcation theory as understand complicated stability phenomena of gene...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
In this paper we investigate the dynamic properties of the Romer model. We determine the whole set o...
CHAOTIC SOLUTIONS IN THE LUCAS MODEL In this paper we show that the investigation of limit set ...
Over the last decades, the ability of the intertemporal equilibrium theory to provide indications ab...
We consider a growth model proposed by Matsuyama [K. Matsuyama, Growing through cycles, Econometrica...
The paper investigates the dynamical properties of a resource optimal system derived by Wirl (2004) ...