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The following pages link to Why many theories of shock waves are necessary: convergence error in formally path-consistent schemes (Q942257):

Displaying 15 items.

Numerical methods for nonconservative hyperbolic systems: a theoretical framework. (Q5470959) (← links)
Exact solution for Riemann problems of the shear shallow water model (Q5867502) (← links)
Thermodynamically compatible discretization of a compressible two-fluid model with two entropy inequalities (Q6053014) (← links)
Artificial viscosity to get both robustness and discrete entropy inequalities (Q6087823) (← links)
The exact Riemann solver to the shallow water equations for natural channels with bottom steps (Q6101085) (← links)
Flux Globalization Based Well-Balanced Path-Conservative Central-Upwind Scheme for the Thermal Rotating Shallow Water Equations (Q6143619) (← links)
Numerical path preserving Godunov schemes for hyperbolic systems (Q6173326) (← links)
Semi-discrete entropy-preserving surface reconstruction schemes for the shallow water equations: analysis of physical structures (Q6553804) (← links)
A local multi-layer approach to modelling interactions between shallow water flows and obstructions (Q6557763) (← links)
Numerical study of the discontinuous Galerkin method for solving the Baer-Munziato equations with instantaneous mechanical relaxation (Q6582442) (← links)
Macro-micro decomposition for consistent and conservative model order reduction of hyperbolic shallow water moment equations: a study using POD-Galerkin and dynamical low-rank approximation (Q6601292) (← links)
A high-order discontinuous Galerkin method for one-fluid two-temperature Euler non-equilibrium hydrodynamics (Q6604514) (← links)
Flux globalization-based well-balanced path-conservative central-upwind scheme for two-dimensional two-layer thermal rotating shallow water equations (Q6614979) (← links)
Numerical schemes for coupled systems of nonconservative hyperbolic equations (Q6622682) (← links)
An asymptotic-preserving and exactly mass-conservative semi-implicit scheme for weakly compressible flows based on compatible finite elements (Q6670729) (← links)