AbstractLagrangian coherent structures are effective barriers, sticky regions, that separate chaotic phase space regions of different dynamical behavior. The usual way to detect such structures is by calculating finite-time Lyapunov exponents. We show that similar results can be obtained for time-periodic systems by calculating finite-time rotation numbers, which are faster to compute. We illustrate our claim by considering examples of continuous- and discrete-time dynamical systems of physical interest
This paper develops the theory and computation of Lagrangian Coherent Structures (LCS), which are de...
This paper investigates cycle and transient lengths of spatially discretized chaotic maps with respe...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...
AbstractLagrangian coherent structures are effective barriers, sticky regions, that separate chaotic...
. We discuss the use of the rotation number to detect periodic solutions in a parameterized family o...
In order to study the behaviour of discrete dynamical systems under adiabatic cyclic variations of t...
We develop a transfer operator-based method for the detection of coherent structures and their assoc...
In the last decades finite time chaos indicators have been used to compute the phase-portraits of co...
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
The properties of long, numerically-determined periodic orbits of two low-dimensional chaotic system...
AbstractA new method of detection of chaos in dynamical systems generated by time-periodic nonautono...
The Birkhoff Ergodic Theorem asserts under mild conditions that Birkhoff averages (i.e. time average...
Statistically distinguishing between phase-coherent and noncoherent chaotic dynamics from time serie...
Chaotic phenomena are getting interest in all spheres of knowledge. In the past there were certain t...
We study the transport properties of nonautonomous chaotic dynamical systems over a finite-time dura...
This paper develops the theory and computation of Lagrangian Coherent Structures (LCS), which are de...
This paper investigates cycle and transient lengths of spatially discretized chaotic maps with respe...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...
AbstractLagrangian coherent structures are effective barriers, sticky regions, that separate chaotic...
. We discuss the use of the rotation number to detect periodic solutions in a parameterized family o...
In order to study the behaviour of discrete dynamical systems under adiabatic cyclic variations of t...
We develop a transfer operator-based method for the detection of coherent structures and their assoc...
In the last decades finite time chaos indicators have been used to compute the phase-portraits of co...
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
The properties of long, numerically-determined periodic orbits of two low-dimensional chaotic system...
AbstractA new method of detection of chaos in dynamical systems generated by time-periodic nonautono...
The Birkhoff Ergodic Theorem asserts under mild conditions that Birkhoff averages (i.e. time average...
Statistically distinguishing between phase-coherent and noncoherent chaotic dynamics from time serie...
Chaotic phenomena are getting interest in all spheres of knowledge. In the past there were certain t...
We study the transport properties of nonautonomous chaotic dynamical systems over a finite-time dura...
This paper develops the theory and computation of Lagrangian Coherent Structures (LCS), which are de...
This paper investigates cycle and transient lengths of spatially discretized chaotic maps with respe...
Regularity and Complexity in Dynamical Systems describes periodic and chaotic behaviors in dynamical...