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Noelle, Sebastian - Institut für Geometrie und Praktische Mathematik, Rheinisch-Westfälische Technische Hochschule Aachen (RWTH)
WELLBALANCED FINITE VOLUME SCHEMES OF ARBITRARY ORDER OF ACCURACY FOR SHALLOW WATER FLOWS
A comparison of third and second order accurate finite volume schemes for the
Wellbalanced finite volume evolution Galerkin methods for the shallow water equations
50 m 100 m 150 m 200 m 250 m totalheight
ON THE ARTIFICIAL COMPRESSION METHOD FOR SECOND-ORDER NONOSCILLATORY CENTRAL DIFFERENCE SCHEMES FOR SYSTEMS
ADAPTIVE TIMESTEP CONTROL FOR INSTATIONARY SOLUTIONS OF THE EULER EQUATIONS
High-order well-balanced finite-volume schemes for barotropic flows.
Convergence of higher order nite volume schemes on irregular grids Sebastian Noelle
On the resolution and stability of central di erence schemes
On the hyperbolicity of two-and three-layer shallow water equations
Timestep control for weakly instationary flows Christina Steiner and Sebastian Noelle
High Resolution Nonoscillatory Central Difference Schemes for the 2D Euler Equations
High-order Well-balanced Schemes Sebastian Noelle, Yulong Xing, Chi-Wang Shu
A note on entropy inequalities and error estimates for higher-order accurate nite volume schemes on
A NEW CONVERGENCE PROOF FOR FINITE VOLUME SCHEMES USING THE KINETIC FORMULATION OF CONSERVATION LAWS #
Radially symmetric solutions for a class of hyperbolic systems of conservation laws.
AN IMPROVED QUADRATURE RULE FOR THE FLUX-COMPUTATION IN HIGH-RESOLUTION NONOSCILLATORY CENTRAL DIFFERENCE
ON ADAPTIVE TIMESTEPPING FOR WEAKLY INSTATIONARY SOLUTIONS OF HYPERBOLIC CONSERVATION LAWS VIA ADJOINT
The MoT-ICE: a new high-resolution wave-propagation algorithm for multi-dimensional
MULTIDIMENSIONAL FLUX-VECTOR-SPLITTING AND HIGH-RESOLUTION CHARACTERISTIC SCHEMES
Semi-Discrete Central-Upwind Schemes for Hyperbolic Conservation Laws and Hamilton-Jacobi Equations
Well-balanced finite volume evolution Galerkin methods for the shallow water equations
Finite Volume Evolution Galerkin Methods for the Shallow Water Equations with Dry Beds
Shock-Capturing and Front-Tracking Methods for Granular Avalanches 1
The MoT-ICE: a new high-resolution wave-propagation algorithm based on
On the advantage of well-balanced schemes for moving-water equilibria of the shallow water equations
Sebastian Noelle Peter D. Lax ( New York University
