Add to ORKGWe investigate the structure of the set of periodic orbits for lattices of coupled piece-wise linear maps exhibiting chaotic behavior, characterizing the bifurcation set when an external parameter is varied
AbstractWe present methods for establishing the full non-linear stabilty of solutions of lattice dyn...
In this paper we present a numerical study of invariant tori in a lattice of coupled logistic maps. ...
We consider lattices of diffusively coupled logistic maps. We show that normally attracting heterocl...
We investigate the structure of the set of periodic orbits for lattices of coupled piece-wise linear...
. - We prove the existence and genericity in a sense of periodic on average behavior for systems of ...
We consider the stability properties of spatial and temporal periodic orbits of one-dimensional coup...
We study the dynamics of Laplacian-type coupling induced by logistic family fμ(x) = μx(1 − x), where...
We obtain the conditions that ensure the stability of spatially and temporally periodic orbits of co...
[[abstract]]We consider a lattice of coupled logistic maps with periodic boundary condition. We prov...
We consider diffusively coupled logistic maps in one- and two-dimensional lattices. We investigate p...
[[abstract]]In this paper, we consider a lattice of the coupled logistic map with periodic boundary ...
We report an interesting phenomenon of wavelength doubling bifurcations in the model of coupled (log...
Abstract — Synchronization phenomena based upon of globally coupled maps are studied in many fields ...
The significant presence of normally attracting invariant manifolds, formed by closed curves or two-...
We study in an abstract way the linear symbolic dynamics which is naturally associated to the codifi...
AbstractWe present methods for establishing the full non-linear stabilty of solutions of lattice dyn...
In this paper we present a numerical study of invariant tori in a lattice of coupled logistic maps. ...
We consider lattices of diffusively coupled logistic maps. We show that normally attracting heterocl...
We investigate the structure of the set of periodic orbits for lattices of coupled piece-wise linear...
. - We prove the existence and genericity in a sense of periodic on average behavior for systems of ...
We consider the stability properties of spatial and temporal periodic orbits of one-dimensional coup...
We study the dynamics of Laplacian-type coupling induced by logistic family fμ(x) = μx(1 − x), where...
We obtain the conditions that ensure the stability of spatially and temporally periodic orbits of co...
[[abstract]]We consider a lattice of coupled logistic maps with periodic boundary condition. We prov...
We consider diffusively coupled logistic maps in one- and two-dimensional lattices. We investigate p...
[[abstract]]In this paper, we consider a lattice of the coupled logistic map with periodic boundary ...
We report an interesting phenomenon of wavelength doubling bifurcations in the model of coupled (log...
Abstract — Synchronization phenomena based upon of globally coupled maps are studied in many fields ...
The significant presence of normally attracting invariant manifolds, formed by closed curves or two-...
We study in an abstract way the linear symbolic dynamics which is naturally associated to the codifi...
AbstractWe present methods for establishing the full non-linear stabilty of solutions of lattice dyn...
In this paper we present a numerical study of invariant tori in a lattice of coupled logistic maps. ...
We consider lattices of diffusively coupled logistic maps. We show that normally attracting heterocl...