We introduce a generalized Ulam method and apply it to symplectic dynamical maps with a divided phase space. Our extensive numerical studies based on the Arnoldi method show that the Ulam approximant of the Perron-Frobenius operator on a chaotic component converges to a continuous limit. Typically, in this regime the spectrum of relaxation modes is characterized by a power law decay for small relaxation rates. Our numerical data show that the exponent of this decay is approximately equal to the exponent of Poincaré recurrences in such systems. The eigenmodes show links with trajectories sticking around stability islands
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
The global behavior of dynamical systems can be studied by analyzing the eigenvalues and correspondi...
A phase transition from integrability to nonintegrability in two-dimensional Hamiltonian mappings is...
We study numerically the statistics of Poincaré recurrences for the Chirikov standard map ...
We use the Ulam method to study spectral properties of the Perron-Frobenius operators of dynamical m...
Abstract. Ulam’s method is a rigorous numerical scheme for approximating invariant densities of dyna...
A dynamical system is a pairing between a set of states X ⊂Rd and a map T : X -> X which describes h...
Information about the behavior of dynamical systems can often be obtained by analyzing the eigenvalu...
For a discrete dynamical system given by a map τ:I→I , the long term behavior is described by the pr...
We report extensive numerical studies on the long-time behavior of a high-dimensional system of coup...
Invited lectureIn 1960 Ulam proposed discretising the Perron-Frobenius operator for a non-singular m...
It is well known that for different classes of transformations, including the class ofpiecewise C2 e...
We employ statistical properties of Poincare recurrences to investigate dynamical behaviors of coupl...
Understanding stickiness and power-law behavior of Poincare recurrence statistics is an open problem...
The Gross-Pitaevski map is a discrete time, split-operator version of the Gross-Pitaevski dynamics i...
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
The global behavior of dynamical systems can be studied by analyzing the eigenvalues and correspondi...
A phase transition from integrability to nonintegrability in two-dimensional Hamiltonian mappings is...
We study numerically the statistics of Poincaré recurrences for the Chirikov standard map ...
We use the Ulam method to study spectral properties of the Perron-Frobenius operators of dynamical m...
Abstract. Ulam’s method is a rigorous numerical scheme for approximating invariant densities of dyna...
A dynamical system is a pairing between a set of states X ⊂Rd and a map T : X -> X which describes h...
Information about the behavior of dynamical systems can often be obtained by analyzing the eigenvalu...
For a discrete dynamical system given by a map τ:I→I , the long term behavior is described by the pr...
We report extensive numerical studies on the long-time behavior of a high-dimensional system of coup...
Invited lectureIn 1960 Ulam proposed discretising the Perron-Frobenius operator for a non-singular m...
It is well known that for different classes of transformations, including the class ofpiecewise C2 e...
We employ statistical properties of Poincare recurrences to investigate dynamical behaviors of coupl...
Understanding stickiness and power-law behavior of Poincare recurrence statistics is an open problem...
The Gross-Pitaevski map is a discrete time, split-operator version of the Gross-Pitaevski dynamics i...
We describe and compare two recent tools for detecting the geometry of resonances of a dynamical sys...
The global behavior of dynamical systems can be studied by analyzing the eigenvalues and correspondi...
A phase transition from integrability to nonintegrability in two-dimensional Hamiltonian mappings is...