Add to ORKGAbstract In this paper a nonlinear discrete-time business cycle model of Kaldor-type is considered, in order to illustrate particular global bifurcations which determine the appearance, or disappearance, of attracting and repelling closed invariant curves. Such bifurcations sequences, which involve homoclinic tangencies and transversal intersection of the stable and unstable manifolds of saddle cycles, may increase the complexity of the basins of attraction of multiple, coexisting attractors. In particular, for the business cycle model examined in this paper, such dynamic phenomena allow to explain the co-existence of two stable steady states and an attracting closed curve, with an intricate basin structure, for wide ranges of the parameter...
Homoclinic cycles exist robustly in dynamical systems with symmetry, and may undergo various bifurca...
In this paper we study a simple model based on the cobweb demand-supply framework with costly innova...
Heteroclinic cycles may occur as structurally stable asymptotically stable attrac-tors if there are ...
In this paper we study some global bifurcations arising in a heterogeneous financial model with fund...
Abstract. We consider a Kaldor-type discrete-time nonlinear business cycle model in income and capit...
In this paper, we study the following Kaldor–Kalecki model of business cycles describing the interac...
The attractors of a dynamical system govern its typical long-term behaviour. The presence of many at...
The purpose of this work is to study a discrete-time nonlinear business cycle model of the Kaldor-ty...
The Kaldor model of the business cycle is modified by the incorporation of a Preisach nonlinearity. ...
This paper deals with a simple multiplier-accelerator model of the business cycle, including a cubic...
We study the bifurcation structure of the parameter space of a 1D continuous piecewise linear bimoda...
Abstract In this lesson we consider discrete time dynamical systems with coexisting attractors, and ...
This paper, following Kaldor's approach, is written with the intention of interpreting fluctuations ...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
R.G. Goodwin mentioned that “economists will be led, as natural scientists have been led, to seek in...
Homoclinic cycles exist robustly in dynamical systems with symmetry, and may undergo various bifurca...
In this paper we study a simple model based on the cobweb demand-supply framework with costly innova...
Heteroclinic cycles may occur as structurally stable asymptotically stable attrac-tors if there are ...
In this paper we study some global bifurcations arising in a heterogeneous financial model with fund...
Abstract. We consider a Kaldor-type discrete-time nonlinear business cycle model in income and capit...
In this paper, we study the following Kaldor–Kalecki model of business cycles describing the interac...
The attractors of a dynamical system govern its typical long-term behaviour. The presence of many at...
The purpose of this work is to study a discrete-time nonlinear business cycle model of the Kaldor-ty...
The Kaldor model of the business cycle is modified by the incorporation of a Preisach nonlinearity. ...
This paper deals with a simple multiplier-accelerator model of the business cycle, including a cubic...
We study the bifurcation structure of the parameter space of a 1D continuous piecewise linear bimoda...
Abstract In this lesson we consider discrete time dynamical systems with coexisting attractors, and ...
This paper, following Kaldor's approach, is written with the intention of interpreting fluctuations ...
Techniques from dynamical systems, specifically from bifurcation theory, are used to investigate the...
R.G. Goodwin mentioned that “economists will be led, as natural scientists have been led, to seek in...
Homoclinic cycles exist robustly in dynamical systems with symmetry, and may undergo various bifurca...
In this paper we study a simple model based on the cobweb demand-supply framework with costly innova...
Heteroclinic cycles may occur as structurally stable asymptotically stable attrac-tors if there are ...