Goal-based error estimation due to spatial discretization and adaptive mesh refinement (AMR) has previously been investigated for the one dimensional, diamond difference, discrete ordinate (1-D DD-SN) method for discretizing the Neutron Transport Equation (NTE). This paper investigates the challenges of extending goal-based error estimation to multi-dimensions with supporting evidence provided on 2-D fixed (extraneous) source and Keff eigenvalue (criticality) verification test cases. It was found that extending Hennart’s weighted residual view of the lowest order 1-D DD equations to multi-dimensions gave what has previously been called the box method. This paper shows how the box method can be extended to higher orders. The paper also shows...
The diffusion synthetic acceleration (DSA) method is a powerful, stable, efficient iteration method ...
The shielding calculation of neutron streaming problems with ducts is characterized by the strong an...
In this paper two discontinuous Galerkin isogeometric analysis methods are developed and applied to ...
A derivation of the dual weighted residual (DWR) goal-based error estimator is given for the 1-D DD-...
The quantity of interest (QoI) associated with a solution of a partial differential equation (PDE) i...
This paper uses local dual weighted residual (DWR) error indicators to flag cells for goal-based ref...
In this thesis several second-order forms of the neutron transport equation (NTE) are spatially dis...
Error norms for three variants of Larsen's benchmark problem are evaluated using three numerical met...
This paper describes a methodology that enables NURBS (Non-Uniform Rational B-spline) based Isogeome...
The discrete ordinates method (SN) is one of the mainstream methods for neutral particle transport c...
In this dissertation, we develop Adaptive Mesh Refinement (AMR) techniques for the steady-state mult...
In this paper a hanging-node, discontinuous Galerkin, isogeometric discretisation of the multigroup,...
The convergence of the discrete ordinates method is studied for angular discretization of the neutro...
In this thesis we study the neutron transport (Boltzmann transport equation) which is used to model ...
The DI algorithm is an alternative to source iteration that, in our testing, does not require an acc...
The diffusion synthetic acceleration (DSA) method is a powerful, stable, efficient iteration method ...
The shielding calculation of neutron streaming problems with ducts is characterized by the strong an...
In this paper two discontinuous Galerkin isogeometric analysis methods are developed and applied to ...
A derivation of the dual weighted residual (DWR) goal-based error estimator is given for the 1-D DD-...
The quantity of interest (QoI) associated with a solution of a partial differential equation (PDE) i...
This paper uses local dual weighted residual (DWR) error indicators to flag cells for goal-based ref...
In this thesis several second-order forms of the neutron transport equation (NTE) are spatially dis...
Error norms for three variants of Larsen's benchmark problem are evaluated using three numerical met...
This paper describes a methodology that enables NURBS (Non-Uniform Rational B-spline) based Isogeome...
The discrete ordinates method (SN) is one of the mainstream methods for neutral particle transport c...
In this dissertation, we develop Adaptive Mesh Refinement (AMR) techniques for the steady-state mult...
In this paper a hanging-node, discontinuous Galerkin, isogeometric discretisation of the multigroup,...
The convergence of the discrete ordinates method is studied for angular discretization of the neutro...
In this thesis we study the neutron transport (Boltzmann transport equation) which is used to model ...
The DI algorithm is an alternative to source iteration that, in our testing, does not require an acc...
The diffusion synthetic acceleration (DSA) method is a powerful, stable, efficient iteration method ...
The shielding calculation of neutron streaming problems with ducts is characterized by the strong an...
In this paper two discontinuous Galerkin isogeometric analysis methods are developed and applied to ...