TY - JOUR
T1 - A generalized nodal finite element formalism for discrete ordinates equations in slab geometry
T2 - Part II: Theory in the discontinuous moment case
AU - Hennart, J. P.
AU - del Valle, E.
N1 - Funding Information:
* Departamento de Metodos Matem6ticos y Numbricos, instituto de Investigaciones en Matembticas Apli-cadas y en Sistemas de la UNAM, Apartado Postal 20-726, 01000, Mexico, D.F. (MEXICO) 5 On sabbatical leave from: Departamento de Ingcnieria Nuclear, Escuela Superior de Fisica y Matemdticas del IPN, Unidad Profesional “Adolio L6pez Maleoa”, 07738, MCxico, D. F. (MEXICO)
PY - 1995/4/1
Y1 - 1995/4/1
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).
UR - http://www.scopus.com/inward/record.url?scp=84950059791&partnerID=8YFLogxK
U2 - 10.1080/00411459508206014
DO - 10.1080/00411459508206014
M3 - Artículo
SN - 0041-1450
VL - 24
SP - 479
EP - 504
JO - Transport Theory and Statistical Physics
JF - Transport Theory and Statistical Physics
IS - 4-5
ER -