Many force–gradient explicit symplectic integration algorithms have been designed for the Hamiltonian H=T(p)+V(q) with kinetic energy T(p)=p2/2 in the existing references. When a force–gradient operator is appropriately adjusted as a new operator, it is still suitable for a class of Hamiltonian problems H=K(p,q)+V(q) with integrable part K(p,q)=∑i=1n∑j=1naijpipj+∑i=1nbipi, where aij=aij(q) and bi=bi(q) are functions of coordinates q. The newly adjusted operator is not a force–gradient operator but is similar to the momentum-version operator associated to the potential V. The newly extended (or adjusted) algorithms are no longer solvers of the original Hamiltonian, but are solvers of slightly modified Hamiltonians. They are explicit symplect...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
35 pages, 10 figures, submittedInternational audienceWe propose to use the properties of the Lie alg...
Os sistemas Hamiltonianos formam uma das classes mais importantes de equações diferenciais. Além de ...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
We take into account the dynamics of three types of models of rotating galaxies in polar coordinates...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
This thesis gives a brief introduction to the Hamiltonian formalism and symplectic geometry. The Ham...
. We find symplectic integrators using universal exponential identities or relations among formal Li...
In recent publications, the construction of explicit symplectic integrators for Schwarzschild- and K...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
Abstract: Symplectic integration methods based on operator splitting are well established in many br...
The disability of classical general-purpose integrators, such as the Runge-Kutta integrators, to exp...
Due to the character of the original source materials and the nature of batch digitization, quality ...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
35 pages, 10 figures, submittedInternational audienceWe propose to use the properties of the Lie alg...
Os sistemas Hamiltonianos formam uma das classes mais importantes de equações diferenciais. Além de ...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
We take into account the dynamics of three types of models of rotating galaxies in polar coordinates...
The so-called structure-preserving methods which reproduce the fundamental properties like symplecti...
The description of the symplectic multi-step algorithm for integration of the equations of motion wi...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
This thesis gives a brief introduction to the Hamiltonian formalism and symplectic geometry. The Ham...
. We find symplectic integrators using universal exponential identities or relations among formal Li...
In recent publications, the construction of explicit symplectic integrators for Schwarzschild- and K...
This paper is a survey on Symplectic Integrator Algorithms (SIA): numerical integrators designed for...
Abstract: Symplectic integration methods based on operator splitting are well established in many br...
The disability of classical general-purpose integrators, such as the Runge-Kutta integrators, to exp...
Due to the character of the original source materials and the nature of batch digitization, quality ...
We present explicit, adaptive symplectic (EASY) integrators for the numerical integration of Hamilto...
35 pages, 10 figures, submittedInternational audienceWe propose to use the properties of the Lie alg...
Os sistemas Hamiltonianos formam uma das classes mais importantes de equações diferenciais. Além de ...