In this paper we use global bifurcation theory as understand complicated stability phenomena of general three-dimensional, economic financial models. ( see also Benhabib J., and Nishimura K., 1979; Benhabib J., 1992; .Mattana P. and Venturi B. 1999; Fiaschi and Sordi, 2002; De Cesare L. and Sportelli M., 2004; Cai J., 2005, Mattana 2004, Nishimura K., Shigoga T., Yano M, 2006, Neri and Venturi 2007). We show that many theoretical results of global indeterminacy of equilibrium can be relating to systems having a homoclinic orbit biasintotic to a stationary point at some value of the parameters. These outcome depend upon the eigenvalues of the Jacobian matrix of the flow evaluated at the stationary point. We apply these results to a re...
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...
Endogenous cycles in standard growth models with capital accumulation of the Solow or the OLG type o...
In this paper we use global bifurcation theory as understand complicated stability phenomena of gene...
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 contributes to the new keynesian literature by showing that stable endogenous cycles can ...
In this paper we prove the existence of a homoclinic orbit in a New Kenesian model. More in detail, ...
This paper shows that global indeterminacy may characterize the three-dimensional vector field impli...
The objective of this study is to prove analytically the existence of the homoclinic orbit in a modi...
In this paper we prove the existence of a homoclinic orbit in the standard Lucas’ two-sector endogen...
CHAOTIC SOLUTIONS IN THE LUCAS MODEL In this paper we show that the investigation of limit set ...
In this paper we investigate the dynamic properties of the Romer model. We determine the whole set o...
This paper considers an endogenous growth model that belongs to the same family as the Lucas model....
This paper explores the possibility of complex dynamics in a variant of the [29] model of endogenous...
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...
Endogenous cycles in standard growth models with capital accumulation of the Solow or the OLG type o...
In this paper we use global bifurcation theory as understand complicated stability phenomena of gene...
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 contributes to the new keynesian literature by showing that stable endogenous cycles can ...
In this paper we prove the existence of a homoclinic orbit in a New Kenesian model. More in detail, ...
This paper shows that global indeterminacy may characterize the three-dimensional vector field impli...
The objective of this study is to prove analytically the existence of the homoclinic orbit in a modi...
In this paper we prove the existence of a homoclinic orbit in the standard Lucas’ two-sector endogen...
CHAOTIC SOLUTIONS IN THE LUCAS MODEL In this paper we show that the investigation of limit set ...
In this paper we investigate the dynamic properties of the Romer model. We determine the whole set o...
This paper considers an endogenous growth model that belongs to the same family as the Lucas model....
This paper explores the possibility of complex dynamics in a variant of the [29] model of endogenous...
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...
Endogenous cycles in standard growth models with capital accumulation of the Solow or the OLG type o...