Variable Eddington Factor Method for the SN Equations with Lumped Discontinuous Galerkin Spatial Discretization Coupled to a Drift-Diffusion Acceleration Equation with Mixed Finite-Element Discretization
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Publication:5066292
DOI10.1080/23324309.2017.1418378OpenAlexW2794382314MaRDI QIDQ5066292
Publication date: 29 March 2022
Published in: Journal of Computational and Theoretical Transport (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/23324309.2017.1418378
mixed finite element methodvariable Eddington factorlumped linear discontinuous Galerkinsource iteration acceleration
Related Items (6)
A quadratic programming flux correction method for high-order DG discretizations of \(S_N\) transport ⋮ A variable Eddington factor method with different spatial discretizations for the radiative transfer equation and the hydrodynamics/radiation-moment equations ⋮ High-Order Mixed Finite Element Variable Eddington Factor Methods ⋮ A variable Eddington factor method for the 1-D grey radiative transfer equations with discontinuous Galerkin and mixed finite-element spatial differencing ⋮ A family of independent variable Eddington factor methods with efficient preconditioned iterative solvers ⋮ Two-Level Transport Methods with Independent Discretization
Cites Work
- Unnamed Item
- Asymptotic solutions of numerical transport problems in optically thick, diffusive regimes
- The Quasi-Diffusion method for solving transport problems in planar and spherical geometries
- High-Order Curvilinear Finite Element Methods for Lagrangian Hydrodynamics
- Reducing the Spatial Discretization Error of Thermal Emission in Implicit Monte Carlo Simulations
- A quasi-diffusion method of solving the kinetic equation
- Towards the ultimate conservative difference scheme I. The quest of monotonicity
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