A new unconditionally energy-stable space-time discretization framework for the linear kinetic transport equation that preserves the asymptotic diffusive limit, including a novel SAT-based Dirichlet boundary treatment.
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2026 2verdicts
UNVERDICTED 2representative citing papers
High-order SI-IMEX-RK WENO schemes for SWEs with topography and friction preserve AP, AA and well-balanced properties without penalization and are more efficient than prior versions.
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Stable and asymptotic preserving space-time discretizations of a linear kinetic transport equation in diffusive scaling
A new unconditionally energy-stable space-time discretization framework for the linear kinetic transport equation that preserves the asymptotic diffusive limit, including a novel SAT-based Dirichlet boundary treatment.
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Asymptotic preserving scheme for the shallow water equations with non-flat bottom topography and Manning friction term
High-order SI-IMEX-RK WENO schemes for SWEs with topography and friction preserve AP, AA and well-balanced properties without penalization and are more efficient than prior versions.