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Autores principales: Avellar, J., Duarte, L. G. S., da Mota, L. A. C. P., Pereira, L. O.
Formato: Preprint
Publicado: 2018
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Acceso en línea:https://arxiv.org/abs/1811.11844
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author Avellar, J.
Duarte, L. G. S.
da Mota, L. A. C. P.
Pereira, L. O.
author_facet Avellar, J.
Duarte, L. G. S.
da Mota, L. A. C. P.
Pereira, L. O.
contents Dynamic systems have a fundamental relevance in the description of physical phenomena. The search for more accurate and faster numerical integration methods for the resolution of such systems is, therefore, an important topic of research. The present work introduces a new approach for the numerical integration of dynamic systems. We propose an association of numerical integration methods (integrators) in order to optimize the performance. The standard we apply is the balance of the duo : precision obtained x running time. The numerical integration methods we have chosen, for this particular instance of association, were the Runge-Kutta of fourth order and seventheighth order. The algorithm was implemented in C++ language. The results showed an improvement in accuracy over the lower grade numerical integrator (actually, we have achieved, basically, the precision of the top integrator) with a processing time performance closer to the one of the lower grade integrator. Similar results can be obtained for other pairs of numerical integration methods.
format Preprint
id arxiv_https___arxiv_org_abs_1811_11844
institution arXiv
publishDate 2018
record_format arxiv
spellingShingle Associative Integrator
Avellar, J.
Duarte, L. G. S.
da Mota, L. A. C. P.
Pereira, L. O.
Computational Physics
Dynamic systems have a fundamental relevance in the description of physical phenomena. The search for more accurate and faster numerical integration methods for the resolution of such systems is, therefore, an important topic of research. The present work introduces a new approach for the numerical integration of dynamic systems. We propose an association of numerical integration methods (integrators) in order to optimize the performance. The standard we apply is the balance of the duo : precision obtained x running time. The numerical integration methods we have chosen, for this particular instance of association, were the Runge-Kutta of fourth order and seventheighth order. The algorithm was implemented in C++ language. The results showed an improvement in accuracy over the lower grade numerical integrator (actually, we have achieved, basically, the precision of the top integrator) with a processing time performance closer to the one of the lower grade integrator. Similar results can be obtained for other pairs of numerical integration methods.
title Associative Integrator
topic Computational Physics
url https://arxiv.org/abs/1811.11844