For a mapping of the torus T 2 we propose a definition of the diffusion coefficient D suggested by the solution of the diffusion equation on T z. The definition of D, based on the limit of moments of the invariant measure, depends on the set f2 where an initial uniform distribution is assigned. For the algebraic automorphism of the torus the limit is proved to exist and to have the same value for almost all initial sets f2 in the subfamily of parallelograms. Numerical results show that it has the same value for arbitrary polygons .62 and for arbitrary moments
none4siWe model chaotic diffusion in a symplectic four-dimensional (4D) map by using the result of a...
Polynomial Hénon like symplectic maps are the basic models in nonlinear beam dynamics. The action-fr...
Abstract. The diffusion process of Hamiltonian map lattice models is numerically studied. For weak n...
For a mapping of the torusT2 we propose a definition of the diffusion coefficientD suggested by the ...
In this article a diffusion equation is obtained as a limit of a reversible kinetic equation with an...
In this article a diffusion equation is obtained as a limit of a reversible kinetic equation with an...
The correlation function method for the calculation of diffusion coefficients that describe chaotic ...
We consider a generic diffusion on the ID torus and give a simple representation formula for the lar...
We introduce a geometric mechanism for di?usion in a priori unstable nearly integrable dynamical sys...
We consider a family of two-dimensional nonlinear area-preserving mappings that generalize the Chiri...
Abstract. We get a rigorous bound for the diffusion constant of the hamiltonian dynamical system gen...
AbstractIn this paper we consider a representative a priori unstable Hamiltonian system with 2+1/2 d...
In this paper we consider a representative a priori unstable Hamiltonian system with 2 + 1/2 degree...
SIGLEAvailable from British Library Document Supply Centre- DSC:DX177949 / BLDSC - British Library D...
In this paper, we study a diffusion stochastic dynamics with a general diffusion coefficient. The ma...
none4siWe model chaotic diffusion in a symplectic four-dimensional (4D) map by using the result of a...
Polynomial Hénon like symplectic maps are the basic models in nonlinear beam dynamics. The action-fr...
Abstract. The diffusion process of Hamiltonian map lattice models is numerically studied. For weak n...
For a mapping of the torusT2 we propose a definition of the diffusion coefficientD suggested by the ...
In this article a diffusion equation is obtained as a limit of a reversible kinetic equation with an...
In this article a diffusion equation is obtained as a limit of a reversible kinetic equation with an...
The correlation function method for the calculation of diffusion coefficients that describe chaotic ...
We consider a generic diffusion on the ID torus and give a simple representation formula for the lar...
We introduce a geometric mechanism for di?usion in a priori unstable nearly integrable dynamical sys...
We consider a family of two-dimensional nonlinear area-preserving mappings that generalize the Chiri...
Abstract. We get a rigorous bound for the diffusion constant of the hamiltonian dynamical system gen...
AbstractIn this paper we consider a representative a priori unstable Hamiltonian system with 2+1/2 d...
In this paper we consider a representative a priori unstable Hamiltonian system with 2 + 1/2 degree...
SIGLEAvailable from British Library Document Supply Centre- DSC:DX177949 / BLDSC - British Library D...
In this paper, we study a diffusion stochastic dynamics with a general diffusion coefficient. The ma...
none4siWe model chaotic diffusion in a symplectic four-dimensional (4D) map by using the result of a...
Polynomial Hénon like symplectic maps are the basic models in nonlinear beam dynamics. The action-fr...
Abstract. The diffusion process of Hamiltonian map lattice models is numerically studied. For weak n...