Efficiency in handling Poisson series is essential to obtain high-accuracy analytical theories in celestial mechanics and non-linear dynamics in general. A good knowledge of the mathematical structure of these objects is fundamental to create data structures to store and handle efficiently its equivalent computational object. In this paper we analyse the mathematical, symbolic and computational structure of Poisson series. © 2001 Academic Press
The problem of quantization in mechanics originated the problem of making the ring of Cco functions ...
We give a short introduction to the methods of representing polynomial and trigonometric series that...
This paper discusses the computational analysis of binomial series. This idea can enable the scienti...
AbstractEfficiency in handling Poisson series is essential to obtain high-accuracy analytical theori...
A massively parallel processor proves to be a powerful tool for manipulating large Poisson series. A...
AbstractPoisson series appear frequently in problems of non-linear dynamics and celestial mechanics....
Poisson series appear frequently in problems of non-linear dynamics and celestial mechanics. The siz...
The method of multiple scales is a global perturbation technique that has resulted to be very useful...
In this report parallelization of a special-purpose computer algebra system, operating on Poisson se...
AbstractThe algebraic structure and the Poisson method for a weakly nonholonomic system are studied....
We revisit the theory of Sheffer sequences by means of the formalism introduced in Rota and Taylor (...
Special efficient Poisson series processors (PSP) have been created. Poison series appear frequently...
Mathematical series and sequences are crucial in scientific disciplines to identify patterns, make p...
In Classical Mechanics one learns how to describe a mechaninal system with n degrees of freedom evol...
This collection presents new and interesting applications of Poisson geometry to some fundamental we...
The problem of quantization in mechanics originated the problem of making the ring of Cco functions ...
We give a short introduction to the methods of representing polynomial and trigonometric series that...
This paper discusses the computational analysis of binomial series. This idea can enable the scienti...
AbstractEfficiency in handling Poisson series is essential to obtain high-accuracy analytical theori...
A massively parallel processor proves to be a powerful tool for manipulating large Poisson series. A...
AbstractPoisson series appear frequently in problems of non-linear dynamics and celestial mechanics....
Poisson series appear frequently in problems of non-linear dynamics and celestial mechanics. The siz...
The method of multiple scales is a global perturbation technique that has resulted to be very useful...
In this report parallelization of a special-purpose computer algebra system, operating on Poisson se...
AbstractThe algebraic structure and the Poisson method for a weakly nonholonomic system are studied....
We revisit the theory of Sheffer sequences by means of the formalism introduced in Rota and Taylor (...
Special efficient Poisson series processors (PSP) have been created. Poison series appear frequently...
Mathematical series and sequences are crucial in scientific disciplines to identify patterns, make p...
In Classical Mechanics one learns how to describe a mechaninal system with n degrees of freedom evol...
This collection presents new and interesting applications of Poisson geometry to some fundamental we...
The problem of quantization in mechanics originated the problem of making the ring of Cco functions ...
We give a short introduction to the methods of representing polynomial and trigonometric series that...
This paper discusses the computational analysis of binomial series. This idea can enable the scienti...