Add to ORKGAbstract—Some complex nonlinear phenomena have reported on the coupled chaotic system included double scroll family. It is considered that investigating bifurcation structures of the system is extremely important to clarify high-order complex nonlinear phenomena. In this study, we investigate bifurcation structures on two coupled cu-bic maps which belongs to double scroll family. By car-rying out computation, bifurcation curves and basins are obtained. 1
We consider a family of one-dimensional discontinuous invertible maps from an application in enginee...
Synchronization phenomena in complex systems are very good models to describe various higher-dimensi...
A two-dimensional noninvertible map is investigated. The conditions of existence for pitchfork bifur...
Abstract: In this work, we consider a family of two-dimensional coupled sine maps. We provide detail...
Abstract — In this study, we investigate synchronization phe-nomena in coupled cubic maps. The cubic...
Abstract — Two coupled logistic maps whose parameters are forced into periodic varying are investiga...
Abstract—In this study, we investigate bifurcations in coupled logistic maps whose parameters are fo...
We study bifurcations of cubic homoclinic tangencies in two-dimensional symplectic maps. We distingu...
Article published in Mathematics Exchange, 8(1), 2011.Motivated by the fact that cubic maps have fou...
Synchronization phenomena in complex systems are very good models to describe various higher-dimensi...
We investigate the dynamics of a family of one-dimensional linear power maps. This family has been s...
AbstractMotivated by a problem in genetics involving one locus with two alleles, R. M. May gave the ...
Chaos theory has several applications in science and engineering. In this work, we announce a new tw...
This paper reports a new bifurcation pattern observed in a Lorenz-type system. The pattern is compos...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
We consider a family of one-dimensional discontinuous invertible maps from an application in enginee...
Synchronization phenomena in complex systems are very good models to describe various higher-dimensi...
A two-dimensional noninvertible map is investigated. The conditions of existence for pitchfork bifur...
Abstract: In this work, we consider a family of two-dimensional coupled sine maps. We provide detail...
Abstract — In this study, we investigate synchronization phe-nomena in coupled cubic maps. The cubic...
Abstract — Two coupled logistic maps whose parameters are forced into periodic varying are investiga...
Abstract—In this study, we investigate bifurcations in coupled logistic maps whose parameters are fo...
We study bifurcations of cubic homoclinic tangencies in two-dimensional symplectic maps. We distingu...
Article published in Mathematics Exchange, 8(1), 2011.Motivated by the fact that cubic maps have fou...
Synchronization phenomena in complex systems are very good models to describe various higher-dimensi...
We investigate the dynamics of a family of one-dimensional linear power maps. This family has been s...
AbstractMotivated by a problem in genetics involving one locus with two alleles, R. M. May gave the ...
Chaos theory has several applications in science and engineering. In this work, we announce a new tw...
This paper reports a new bifurcation pattern observed in a Lorenz-type system. The pattern is compos...
The main features and components of a new so-called bifurcation theory of nonlinear dynamics and cha...
We consider a family of one-dimensional discontinuous invertible maps from an application in enginee...
Synchronization phenomena in complex systems are very good models to describe various higher-dimensi...
A two-dimensional noninvertible map is investigated. The conditions of existence for pitchfork bifur...