: We describe how long-term solar system orbit integration could be implemented on a parallel computer. The interesting feature of our algorithm is that each processor is assigned not to a planet or a pair of planets but to a time-interval. Thus, the 1st week, 2nd week,: : : , 1000th week of an orbit are computed concurrently. The problem of matching the input to the (n + 1)-st processor with the output of the n-th processor can be solved efficiently by an iterative procedure. Our work is related to the so-called waveform relaxation methods in the computational mathematics literature, but is specialized to the Hamiltonian and nearly integrable nature of solar system orbits. Simulations on serial machines suggest that, for the reasonable acc...
From careful observations, scientists derive rules to describe phenomena in nature. These rules are ...
Many orbit problems in celestial mechanics are described by (nonstiff) initial-value problems (IVPs)...
We consider the comparison of multigrid methods for parabolic partial differential equations that al...
: We describe how long-term solar system orbit integration could be implemented on a parallel comput...
We describe how long-term solar system orbit integration could be implemented on a parallel computer...
One aspect of celestial mechanics is the computation of the long-term orbits of celestial bodies. T...
We present an algorithm for the rapid numerical integration of a time-periodic ODE with a small diss...
We compare the performance of four symplectic integration methods with leading order symplectic corr...
Orbit enumerations represent an important class of mathematical algorithms which is widely used in c...
High order multistep methods, run at constant stepsize, are very effective for integrating the New...
As computer architectures have advanced to utilize multiple computational cores in parallel, few met...
A new version of the numerical model of artificial Earth satellites (AES) motion is presented, which...
For the time integration of collisional-body systems, such as star clusters and systems of planetesi...
Context. Thanks to our expanding knowledge of the Galactic and stellar neighborhood of the Solar Sys...
Abstract. Orbit enumerations represent an important class of mathemat-ical algorithms which is widel...
From careful observations, scientists derive rules to describe phenomena in nature. These rules are ...
Many orbit problems in celestial mechanics are described by (nonstiff) initial-value problems (IVPs)...
We consider the comparison of multigrid methods for parabolic partial differential equations that al...
: We describe how long-term solar system orbit integration could be implemented on a parallel comput...
We describe how long-term solar system orbit integration could be implemented on a parallel computer...
One aspect of celestial mechanics is the computation of the long-term orbits of celestial bodies. T...
We present an algorithm for the rapid numerical integration of a time-periodic ODE with a small diss...
We compare the performance of four symplectic integration methods with leading order symplectic corr...
Orbit enumerations represent an important class of mathematical algorithms which is widely used in c...
High order multistep methods, run at constant stepsize, are very effective for integrating the New...
As computer architectures have advanced to utilize multiple computational cores in parallel, few met...
A new version of the numerical model of artificial Earth satellites (AES) motion is presented, which...
For the time integration of collisional-body systems, such as star clusters and systems of planetesi...
Context. Thanks to our expanding knowledge of the Galactic and stellar neighborhood of the Solar Sys...
Abstract. Orbit enumerations represent an important class of mathemat-ical algorithms which is widel...
From careful observations, scientists derive rules to describe phenomena in nature. These rules are ...
Many orbit problems in celestial mechanics are described by (nonstiff) initial-value problems (IVPs)...
We consider the comparison of multigrid methods for parabolic partial differential equations that al...