Symplectic integration algorithms have become popular in recent years in long-term orbital integrations because these algorithms enforce certain conservation laws that are intrinsic to Hamiltonian systems. For problems with large variations in timescale, it is desirable to use a variable timestep. However, naively varying the timestep destroys the desirable properties of symplectic integrators. We discuss briefly the idea that choosing the timestep in a time symmetric manner can improve the performance of variable timestep integrators. Then we present a symplectic integrator which is based on decomposing the force into components and applying the component forces with different timesteps. This multiple timescale symplectic integrator has al...
International audienceWe present a new mixed variable symplectic (MVS) integrator for planetary syst...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
AbstractThe connection between closed Newton–Cotes differential methods and symplectic integrators i...
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
New numerical integrators specifically designed for solving the two-body gravitational problem with ...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...
Calculating the long-term solution of ordinary differential equations, such as those of the N-body p...
We present a new symplectic integrator designed for collisional gravitational N-body problems which ...
International audienceFor general optimal control problems, Pontryagin's maximum principle gives nec...
This paper describes a novel fourth-order integration algorithm for the gravitational N-body problem...
Many force–gradient explicit symplectic integration algorithms have been designed for the Hamiltonia...
We present new splitting methods designed for the numerical integration of near-integrable Hamiltoni...
Using a Newtonian model of the Solar System with all 8 planets, we perform extensive tests on variou...
For general optimal control problems, Pontryagin’s maximum principle gives necessary optimality cond...
This paper studies variational principles for mechanical systems with symmetry and their application...
International audienceWe present a new mixed variable symplectic (MVS) integrator for planetary syst...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
AbstractThe connection between closed Newton–Cotes differential methods and symplectic integrators i...
Symplectic integration algorithms are well-suited for long-term integrations of Hamiltonian systems ...
New numerical integrators specifically designed for solving the two-body gravitational problem with ...
Symplectic methods for Hamiltonian systems are known to have favourable pro-per-ties concerning long...
Calculating the long-term solution of ordinary differential equations, such as those of the N-body p...
We present a new symplectic integrator designed for collisional gravitational N-body problems which ...
International audienceFor general optimal control problems, Pontryagin's maximum principle gives nec...
This paper describes a novel fourth-order integration algorithm for the gravitational N-body problem...
Many force–gradient explicit symplectic integration algorithms have been designed for the Hamiltonia...
We present new splitting methods designed for the numerical integration of near-integrable Hamiltoni...
Using a Newtonian model of the Solar System with all 8 planets, we perform extensive tests on variou...
For general optimal control problems, Pontryagin’s maximum principle gives necessary optimality cond...
This paper studies variational principles for mechanical systems with symmetry and their application...
International audienceWe present a new mixed variable symplectic (MVS) integrator for planetary syst...
Abstract We consider Sundman and Poincaré transformations for the long-time numerical integration of...
AbstractThe connection between closed Newton–Cotes differential methods and symplectic integrators i...