The objective of this work is to investigate the thick diffusion limit of various spatial discretizations of the one-dimensional, steady-state, monoenergetic, discrete ordinates neutron transport equation. This work specifically addresses the two lowest order nodal methods, AHOT-N0 and AHOT-N1, as well as reconsiders the asymptotic limit of the Diamond Difference method. The asymptotic analyses of the AHOT-N0 and AHOT-N1 nodal methods show that AHOT-N0 does not possess the thick diffusion limit for cell edge or cell average fluxes except under very limiting conditions, which is to be expected considering the AHOT-N0 method limits to the Step method in the thick diffusion limit. The AHOT-N1 method, which uses a linear in-cell representation ...
In a previous paper, Morel and Montry used a Galerkin-based diffusion analysis to define a particula...
The main goal of this work is to examine efficient methods for solving neutron transport and diffusi...
The objective of this paper is to give a mathematical framework for a fully discrete numerical appro...
In a recent article (Larsen, Morel, and Miller, J. Comput. Phys. 69, 283 (1987)), a theoretical meth...
Error norms for three variants of Larsen's benchmark problem are evaluated using three numerical met...
The basic problem addressed in the project was that of accelerating the iterative convergence of Dis...
We consider the numerical solution of the single-group, steady state, isotropic transport equation. ...
In this work, we develop a new spatial discretization scheme that may be used to numerically solve t...
313 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1985.A new high-accuracy, coarse-m...
In this paper two discontinuous Galerkin isogeometric analysis methods are developed and applied to ...
The diffusion synthetic acceleration (DSA) method is a powerful, stable, efficient iteration method ...
The diffusion synthetic acceleration (DSA) method has emerged as a powerful tool for accelerating th...
In this research the singular perturbation technique is used to solve the one-dimensional neutron tr...
The integral form of the one-speed, steady-state Boltzmann transport equation is solved for a point ...
The usual strategy for solving the neutron diffusion equation in two or three dimensions by nodal me...
In a previous paper, Morel and Montry used a Galerkin-based diffusion analysis to define a particula...
The main goal of this work is to examine efficient methods for solving neutron transport and diffusi...
The objective of this paper is to give a mathematical framework for a fully discrete numerical appro...
In a recent article (Larsen, Morel, and Miller, J. Comput. Phys. 69, 283 (1987)), a theoretical meth...
Error norms for three variants of Larsen's benchmark problem are evaluated using three numerical met...
The basic problem addressed in the project was that of accelerating the iterative convergence of Dis...
We consider the numerical solution of the single-group, steady state, isotropic transport equation. ...
In this work, we develop a new spatial discretization scheme that may be used to numerically solve t...
313 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1985.A new high-accuracy, coarse-m...
In this paper two discontinuous Galerkin isogeometric analysis methods are developed and applied to ...
The diffusion synthetic acceleration (DSA) method is a powerful, stable, efficient iteration method ...
The diffusion synthetic acceleration (DSA) method has emerged as a powerful tool for accelerating th...
In this research the singular perturbation technique is used to solve the one-dimensional neutron tr...
The integral form of the one-speed, steady-state Boltzmann transport equation is solved for a point ...
The usual strategy for solving the neutron diffusion equation in two or three dimensions by nodal me...
In a previous paper, Morel and Montry used a Galerkin-based diffusion analysis to define a particula...
The main goal of this work is to examine efficient methods for solving neutron transport and diffusi...
The objective of this paper is to give a mathematical framework for a fully discrete numerical appro...