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The RungeKutta discontinuous Galerkin method for conservation laws V: multidimensional systems
, 1997
"... This is the fifth paper in a series in which we construct and study the socalled RungeKutta Discontinuous Galerkin method for numerically solving hyperbolic conservation laws. In this paper, we extend the method to multidimensional nonlinear systems of conservation laws. The algorithms are describ ..."
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Cited by 508 (44 self)
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This is the fifth paper in a series in which we construct and study the socalled RungeKutta Discontinuous Galerkin method for numerically solving hyperbolic conservation laws. In this paper, we extend the method to multidimensional nonlinear systems of conservation laws. The algorithms
conservation laws
, 2012
"... Extension of the complete flux scheme to systems of conservation laws by ..."
The Conservation Law
, 2001
"... Introduction For more than 150 years, starting with mechanical systems, the fact that certain quantities such as energy, momentum, etc. are constant in physical processes has led to an increasing number of conservation laws. With the advent of quantum physics, new conserved quantities, such as bary ..."
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Introduction For more than 150 years, starting with mechanical systems, the fact that certain quantities such as energy, momentum, etc. are constant in physical processes has led to an increasing number of conservation laws. With the advent of quantum physics, new conserved quantities
Nonoscillatory central differencing for hyperbolic conservation laws
 J. COMPUT. PHYS
, 1990
"... Many of the recently developed highresolution schemes for hyperbolic conservation laws are based on upwind differencing. The building block of these schemes is the averaging of an approximate Godunov solver; its time consuming part involves the fieldbyfield decomposition which is required in orde ..."
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Cited by 298 (25 self)
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Many of the recently developed highresolution schemes for hyperbolic conservation laws are based on upwind differencing. The building block of these schemes is the averaging of an approximate Godunov solver; its time consuming part involves the fieldbyfield decomposition which is required
Comments on conformal masses, asymptotic backgrounds and conservation laws
"... and conservation laws ..."
On conservation laws with discontinuous flux
 Trends in Applications of Mathematics to Mechanics, Shaker
, 2005
"... In this contribution we are interested in spatially onedimensional conservation laws ut + F ..."
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Cited by 9 (5 self)
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In this contribution we are interested in spatially onedimensional conservation laws ut + F
Computational Methods for Hyperbolic Conservation Laws
"... These notes concern hyperbolic conservation laws. Conservation laws are PDEs with a ..."
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These notes concern hyperbolic conservation laws. Conservation laws are PDEs with a
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