In order to study the behaviour of discrete dynamical systems under adiabatic cyclic variations of their parameters, we consider discrete versions of adiabatically-rotated rotators. Parallelling the studies in continuous systems, we generalize the concept of geometric phase to discrete dynamics and investigate its presence in these rotators. For the rotated sine circle map, we demonstrate an analytical relationship between the geometric phase and the rotation number of the system. For the discrete version of the rotated rotator considered by Berry, the rotated standard map, we further explore this connection as well as the role of the geometric phase at the onset of chaos. Further into the chaotic regime, we show that the geometric phase is...
Within the adiabatic theorem we must explicitly add to the instantaneous adiabatic vectors, parametr...
Abstract. We study the nonequilibrium phenomena of a coupled ac-tive rotator model in complex networ...
In this paper, we study rotation numbers of random dynamical systems on the circle. We prove the exi...
This book develops analytical methods for studying the dynamical chaos, synchronization, and dynamic...
A geometrical phase is constructed for dissipative dynamical systems possessing continuous symmetrie...
. We discuss the use of the rotation number to detect periodic solutions in a parameterized family o...
A rigorous mathematical treatment of chaotic phase synchronization is still lacking, although it has...
In this thesis we investigate a chaos in dynamical systems described by the Hamilton function using ...
This paper is concerned with the relation between the dynamics of a given Hamiltonian system with a ...
Abstract: The qualitative and experimental investigation of a dynamical system representin...
This book looks at dynamics as an iteration process where the output of a function is fed back as an...
This paper is concerned with the relation between the dynamics of a given Hamiltonian system with a ...
In many parameter-dependent systems, varying the parameters along a closed path generates a shift in...
AbstractLagrangian coherent structures are effective barriers, sticky regions, that separate chaotic...
Geometric phases describe how in a continuous-time dynamical system the displacement of a variable (...
Within the adiabatic theorem we must explicitly add to the instantaneous adiabatic vectors, parametr...
Abstract. We study the nonequilibrium phenomena of a coupled ac-tive rotator model in complex networ...
In this paper, we study rotation numbers of random dynamical systems on the circle. We prove the exi...
This book develops analytical methods for studying the dynamical chaos, synchronization, and dynamic...
A geometrical phase is constructed for dissipative dynamical systems possessing continuous symmetrie...
. We discuss the use of the rotation number to detect periodic solutions in a parameterized family o...
A rigorous mathematical treatment of chaotic phase synchronization is still lacking, although it has...
In this thesis we investigate a chaos in dynamical systems described by the Hamilton function using ...
This paper is concerned with the relation between the dynamics of a given Hamiltonian system with a ...
Abstract: The qualitative and experimental investigation of a dynamical system representin...
This book looks at dynamics as an iteration process where the output of a function is fed back as an...
This paper is concerned with the relation between the dynamics of a given Hamiltonian system with a ...
In many parameter-dependent systems, varying the parameters along a closed path generates a shift in...
AbstractLagrangian coherent structures are effective barriers, sticky regions, that separate chaotic...
Geometric phases describe how in a continuous-time dynamical system the displacement of a variable (...
Within the adiabatic theorem we must explicitly add to the instantaneous adiabatic vectors, parametr...
Abstract. We study the nonequilibrium phenomena of a coupled ac-tive rotator model in complex networ...
In this paper, we study rotation numbers of random dynamical systems on the circle. We prove the exi...