A PL spherical harmonics-nodal collocation method is applied to the solution of the multidimensional neutron source transport equation. Vacuum boundary conditions are approximated by setting Marshak's conditions. The method is applied to several 1D, 2D and 3D problems with isotropic fixed source and with isotropic and anisotropic scattering. These problems are chosen to test this method in limit conditions, showing that in some cases a high order $P_L$ approximation is required to obtain accurate results and convergence. Results are also compared with the ones provided by several reference codes showing good agreement. It is also shown that Marshak's approximation to vacuum boundary...
In this work, a solution for a two-dimensional neutron transport problem, in cartesian geometry, is ...
Typescript (photocopy).An approximate solution method has been developed to solve the one-dimensiona...
The investigation is concerned with the nodal difference circuits for the transfer equation in appro...
PL equations are classical approximations to the neutron transport equations, which are obtained exp...
[EN] A classical discretization for the angular dependence of the neutron transport equation is base...
A nodal method based upon the least squares minimization technique has been developed for solving th...
Includes bibliographical references (leaves 265-277)A new numerical method is developed to solve the...
The three-dimensional nodal neutron transport code based upon a modular least squares approximation ...
313 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1985.A new high-accuracy, coarse-m...
Transport solutions to the monoenergetic plane, spherical, and cylindrical critical problems with is...
[EN] The methods presented in this paper solve the Simplified Spherical Harmonics approximation to t...
The usual strategy for solving the neutron diffusion equation in two or three dimensions by nodal me...
In order to develop models that contain more accurate transport physics than standard P$\sb1$ theory...
A nodal method is developed for the solution of the neutron-diffusion equation in two- and three-dim...
The nodal methods are significantly more accurate than the traditional methods such as finite differ...
In this work, a solution for a two-dimensional neutron transport problem, in cartesian geometry, is ...
Typescript (photocopy).An approximate solution method has been developed to solve the one-dimensiona...
The investigation is concerned with the nodal difference circuits for the transfer equation in appro...
PL equations are classical approximations to the neutron transport equations, which are obtained exp...
[EN] A classical discretization for the angular dependence of the neutron transport equation is base...
A nodal method based upon the least squares minimization technique has been developed for solving th...
Includes bibliographical references (leaves 265-277)A new numerical method is developed to solve the...
The three-dimensional nodal neutron transport code based upon a modular least squares approximation ...
313 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 1985.A new high-accuracy, coarse-m...
Transport solutions to the monoenergetic plane, spherical, and cylindrical critical problems with is...
[EN] The methods presented in this paper solve the Simplified Spherical Harmonics approximation to t...
The usual strategy for solving the neutron diffusion equation in two or three dimensions by nodal me...
In order to develop models that contain more accurate transport physics than standard P$\sb1$ theory...
A nodal method is developed for the solution of the neutron-diffusion equation in two- and three-dim...
The nodal methods are significantly more accurate than the traditional methods such as finite differ...
In this work, a solution for a two-dimensional neutron transport problem, in cartesian geometry, is ...
Typescript (photocopy).An approximate solution method has been developed to solve the one-dimensiona...
The investigation is concerned with the nodal difference circuits for the transfer equation in appro...