A generalized nodal finite element formalism for discrete ordinates equations in slab geometry: Part II: Theory in the discontinuous moment case

J. P. Hennart; E. del Valle

doi:10.1080/00411459508206014

A generalized nodal finite element formalism for discrete ordinates equations in slab geometry: Part II: Theory in the discontinuous moment case

J. P. Hennart, E. del Valle

Producción científica: Contribución a una revista › Artículo › revisión exhaustiva

10 Citas (Scopus)

Resumen

A generalized nodal finite element formalism is presented, which covers virtually all known finite difference approximations to the discrete ordinates equations in slab geometry. This paper (hereafter referred to as Part II) presents the theory of the so-called “discontinuous moment methods”, which include such well-known methods as the “linear discontinuous” scheme. It is the sequel of a first paper (Part I) where “continuous moment methods” were presented. Corresponding numerical results for all the schemes of both parts will be presented in a third paper (Part III).

Idioma original	Inglés
Páginas (desde-hasta)	479-504
Número de páginas	26
Publicación	Transport Theory and Statistical Physics
Volumen	24
N.º	4-5
DOI	https://doi.org/10.1080/00411459508206014
Estado	Publicada - 1 abr. 1995
Publicado de forma externa	Sí

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abstract = "A generalized nodal finite element formalism is presented, which covers virtually all known finite difference approximations to the discrete ordinates equations in slab geometry. This paper (hereafter referred to as Part II) presents the theory of the so-called “discontinuous moment methods”, which include such well-known methods as the “linear discontinuous” scheme. It is the sequel of a first paper (Part I) where “continuous moment methods” were presented. Corresponding numerical results for all the schemes of both parts will be presented in a third paper (Part III).",

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N2 - A generalized nodal finite element formalism is presented, which covers virtually all known finite difference approximations to the discrete ordinates equations in slab geometry. This paper (hereafter referred to as Part II) presents the theory of the so-called “discontinuous moment methods”, which include such well-known methods as the “linear discontinuous” scheme. It is the sequel of a first paper (Part I) where “continuous moment methods” were presented. Corresponding numerical results for all the schemes of both parts will be presented in a third paper (Part III).

AB - A generalized nodal finite element formalism is presented, which covers virtually all known finite difference approximations to the discrete ordinates equations in slab geometry. This paper (hereafter referred to as Part II) presents the theory of the so-called “discontinuous moment methods”, which include such well-known methods as the “linear discontinuous” scheme. It is the sequel of a first paper (Part I) where “continuous moment methods” were presented. Corresponding numerical results for all the schemes of both parts will be presented in a third paper (Part III).

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JO - Transport Theory and Statistical Physics

JF - Transport Theory and Statistical Physics

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ER -

A generalized nodal finite element formalism for discrete ordinates equations in slab geometry: Part II: Theory in the discontinuous moment case

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