We concentrate on the dynamics of one-dimensional and two-dimensional cubic maps, it describes how complex behaviors can possibly arise as a system parameter changes. This is a large class of diffeomorphisms which provide a good starting point for understanding polynomial diffeomorphisms with constant Jacobian and equivalent to a composition of generalized Hénon maps. Due to the theoretical and practical difficulties involved in the study, computers will presumably play a role in such efforts
summary:For several specific mappings we show their chaotic behaviour by detecting the existence of ...
Abstract — In this study, we investigate synchronization phe-nomena in coupled cubic maps. The cubic...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...
Article published in Mathematics Exchange, 8(1), 2011.Motivated by the fact that cubic maps have fou...
In general a polynomial automorphism of the plane can be written as a composition of generalized Hen...
Abstract. We introduce the notion of quasi-expansion in the context of polynomial diffeomorphisms of...
We construct branched coverings such as matings and captures to describe the dynamics of every criti...
We extend and improve the existing characterization of the dynamics of general quadratic real polyno...
This book is essentially devoted to complex properties (Phase plane structure and bifurcations) of t...
With computers, we are able to construct complicated fractal im-ages that describe the dynamics of c...
We study bifurcations of cubic homoclinic tangencies in two-dimensional symplectic maps. We distingu...
The dynamics of complex cubic polynomials have been studied extensively in the recent years. The mai...
AbstractMotivated by a problem in genetics involving one locus with two alleles, R. M. May gave the ...
Dynamic systems play a key role in various directions of modern science and engineering, such as the...
This text is written for the students in the Master program at the University of Paris 6. Only a kno...
summary:For several specific mappings we show their chaotic behaviour by detecting the existence of ...
Abstract — In this study, we investigate synchronization phe-nomena in coupled cubic maps. The cubic...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...
Article published in Mathematics Exchange, 8(1), 2011.Motivated by the fact that cubic maps have fou...
In general a polynomial automorphism of the plane can be written as a composition of generalized Hen...
Abstract. We introduce the notion of quasi-expansion in the context of polynomial diffeomorphisms of...
We construct branched coverings such as matings and captures to describe the dynamics of every criti...
We extend and improve the existing characterization of the dynamics of general quadratic real polyno...
This book is essentially devoted to complex properties (Phase plane structure and bifurcations) of t...
With computers, we are able to construct complicated fractal im-ages that describe the dynamics of c...
We study bifurcations of cubic homoclinic tangencies in two-dimensional symplectic maps. We distingu...
The dynamics of complex cubic polynomials have been studied extensively in the recent years. The mai...
AbstractMotivated by a problem in genetics involving one locus with two alleles, R. M. May gave the ...
Dynamic systems play a key role in various directions of modern science and engineering, such as the...
This text is written for the students in the Master program at the University of Paris 6. Only a kno...
summary:For several specific mappings we show their chaotic behaviour by detecting the existence of ...
Abstract — In this study, we investigate synchronization phe-nomena in coupled cubic maps. The cubic...
The iterations of real maps represent one of the easiest models of dynami-cal systems, but, despite ...