First -order continuous- and discontinuous-Galerkin moment models for a linear kinetic equation: Model derivation and realizability theory

We provide two new classes of moment models for linear kinetic equations in slab and three-dimensional geometry. They are based on classical finite elements and low-order discontinuous-Galerkin approximations on the unit sphere. We investigate their realizability conditions and other basic properties. Numerical tests show that these models are more efficient than classical full-moment models in a space-homogeneous test, when the analytical solution is not smooth. © 2020 Elsevier Inc.