Two algorithms to construct a consistent first order theory of equilibrium figures of close binary systems
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Otros documentos de la autoría: López Ortí, José Antonio; Forner Gumbau, Manuel; Barreda Rochera, Miguel
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Two algorithms to construct a consistent first order theory of equilibrium figures of close binary systemsFecha de publicación
2016-12Editor
ElsevierCita bibliográfica
LÓPEZ ORTÍ, José A. ; FORNER GUMBAU, Manuel; BARREDA ROCHERA, Miguel. Two algorithms to construct a consistent first order theory of equilibrium figures of close binary systems. Journal of Computational and Applied Mathematics, 2016.Tipo de documento
info:eu-repo/semantics/articleVersión de la editorial
http://www.sciencedirect.com/science/article/pii/S0377042716306252Versión
info:eu-repo/semantics/sumittedVersionPalabras clave / Materias
Resumen
One of the main problems in celestial mechanics is the study of the shape adopted by extended deformable celestial bodies in its equilibrium configuration. In this paper, a new point of view about classical theories ... [+]
One of the main problems in celestial mechanics is the study of the shape adopted by extended deformable celestial bodies in its equilibrium configuration. In this paper, a new point of view about classical theories on equilibrium figures in close binary systems is offered.
Classical methods are based on the evaluation of the self-gravitational, centrifugal and tidal potentials. The most common technique used by classical methods shows convergence problems. To solve this problem up to first order in amplitudes two algorithms has been developed, the first one based on the Laplace method to develop the inverse of the distance and the second one based on the asymptotic properties of the numerical quadrature formulas. [-]
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Journal of Computational and Applied Mathematics December 2016Derechos de acceso
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