Linear discontinuous (LD) spatial discretization of the transport operator can generate negative angular flux solutions. In slab geometry, negativities are limited to optically thick cells. However, in multi-dimension problems, negativities can even occur in voids. Past attempts to eliminate the negativities associated with LD have focused on inherently positive solution shapes and ad-hoc fixups. We present a new, strictly non-negative finite element method that reduces to the LD method whenever the LD solution is everywhere positive. The new method assumes an angular flux distribution, e , that is a linear function in space, but with all negativities set-to- zero. Our new scheme always conserves the zeroth and linear spatial momen...
A nonlinear spatial multigrid algorithm was developed and explored as a technique to efficiently sol...
The objective of this project is to develop and demonstrate more efficient methods for solving radia...
We propose a positive, accurate moment closure for linear kinetic transport equations based on a fil...
Linear discontinuous (LD) spatial discretization of the transport operator can generate negative an...
In this dissertation we discuss the development, implementation, analysis and testing of the Piecew...
We introduce a conservative fixup strategy to remedy negative fluxes within a linear discontinuous s...
In this dissertation we present advances to the nonlinear diffusion acceleration for void regions us...
The recently developed exponential discontinuous spatial differencing scheme for the discrete-ordina...
We describe a new nonlinear spatial differencing scheme for solving the discrete-ordinate transport ...
AFIT researchers have developed a new approach to solving Discrete Ordinates equations, which approx...
The linear discontinuous finite element method (LDFEM) is the current work horse of the radiation tr...
International audienceA new space-angle multi-grid technique has been developed to accelerate the fr...
In this dissertation, advanced numerical methods for highly forward peaked scattering deterministic ...
Characteristic spatial quadratures for discrete ordinates calculations on meshes of arbitrary tetrah...
A simple Richardson iteration procedure converges slowly when applied to thick, diffusive problems w...
A nonlinear spatial multigrid algorithm was developed and explored as a technique to efficiently sol...
The objective of this project is to develop and demonstrate more efficient methods for solving radia...
We propose a positive, accurate moment closure for linear kinetic transport equations based on a fil...
Linear discontinuous (LD) spatial discretization of the transport operator can generate negative an...
In this dissertation we discuss the development, implementation, analysis and testing of the Piecew...
We introduce a conservative fixup strategy to remedy negative fluxes within a linear discontinuous s...
In this dissertation we present advances to the nonlinear diffusion acceleration for void regions us...
The recently developed exponential discontinuous spatial differencing scheme for the discrete-ordina...
We describe a new nonlinear spatial differencing scheme for solving the discrete-ordinate transport ...
AFIT researchers have developed a new approach to solving Discrete Ordinates equations, which approx...
The linear discontinuous finite element method (LDFEM) is the current work horse of the radiation tr...
International audienceA new space-angle multi-grid technique has been developed to accelerate the fr...
In this dissertation, advanced numerical methods for highly forward peaked scattering deterministic ...
Characteristic spatial quadratures for discrete ordinates calculations on meshes of arbitrary tetrah...
A simple Richardson iteration procedure converges slowly when applied to thick, diffusive problems w...
A nonlinear spatial multigrid algorithm was developed and explored as a technique to efficiently sol...
The objective of this project is to develop and demonstrate more efficient methods for solving radia...
We propose a positive, accurate moment closure for linear kinetic transport equations based on a fil...