This paper introduces a new finite element approximation for multi-dimensional transport problems in piecewise homogeneous media. The transport equation is solved using a Galerkin technique with polynomial basis functions in space-angle variables derived from asymptotic transport theory. The phase space is partitioned into cells consistent with the geometry and having each an elemental expansion which is not a tensor product. Improved accuracy may be obtained by multiplying the number of cells or/and increasing the polynomial degree. Numerical results on 1D and 2D reference problems in square geometry show a good agreement with other approximate methods.SCOPUS: ar.jinfo:eu-repo/semantics/publishe
A new Discrete Ordinates transport solver for unstructured tetrahedral meshes is presented. The solv...
A response matrix method is applied to the time independent, mono-energetic transport equation. The ...
This paper describes applications of the discretization procedure presented in the companion paper [...
This paper introduces a new finite element approximation for multi-dimensional transport problems in...
Abstract: The problem of solving the transport equation by the discontinuous finite elemen...
Graduation date: 2005Wachspress rational functions are ratios of polynomials having certain properti...
We develop a piecewise linear (PWL) Galerkin finite element spatial discretization for the multi-dim...
Abstract: The numerical method is developed for solving the multigroup non-stationary tran...
new finite element discretization method for a class of two-phase mass transport problems is present...
This paper presents an implementation and a comparison of two spatial discretisation schemes over a ...
Abstract: Formulæ for computational transport simulations specified. Based on angular Sn a...
This work is the first part in a series of two articles, where the objective is to construct, analyz...
High-dimensional partial differential equations with nonnegative characteristic form arise in numero...
The use of the finite element method for solving two-dimensional static neutron diffusion problems i...
This paper describes an extension to the hexagonal geometry of some weakly discontinuous nodal finit...
A new Discrete Ordinates transport solver for unstructured tetrahedral meshes is presented. The solv...
A response matrix method is applied to the time independent, mono-energetic transport equation. The ...
This paper describes applications of the discretization procedure presented in the companion paper [...
This paper introduces a new finite element approximation for multi-dimensional transport problems in...
Abstract: The problem of solving the transport equation by the discontinuous finite elemen...
Graduation date: 2005Wachspress rational functions are ratios of polynomials having certain properti...
We develop a piecewise linear (PWL) Galerkin finite element spatial discretization for the multi-dim...
Abstract: The numerical method is developed for solving the multigroup non-stationary tran...
new finite element discretization method for a class of two-phase mass transport problems is present...
This paper presents an implementation and a comparison of two spatial discretisation schemes over a ...
Abstract: Formulæ for computational transport simulations specified. Based on angular Sn a...
This work is the first part in a series of two articles, where the objective is to construct, analyz...
High-dimensional partial differential equations with nonnegative characteristic form arise in numero...
The use of the finite element method for solving two-dimensional static neutron diffusion problems i...
This paper describes an extension to the hexagonal geometry of some weakly discontinuous nodal finit...
A new Discrete Ordinates transport solver for unstructured tetrahedral meshes is presented. The solv...
A response matrix method is applied to the time independent, mono-energetic transport equation. The ...
This paper describes applications of the discretization procedure presented in the companion paper [...