New High-Resolution Central Schemes for Nonlinear Conservation Laws and Convection–Diffusion Equations (original) (raw)

A Third-Order Semidiscrete Central Scheme for Conservation Laws and Convection-Diffusion Equations

Alexander Kurganov

SIAM Journal on Scientific Computing, 2000

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Giovanni Russo

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Giovanni Russo

Siam Journal on Scientific Computing, 1999

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Chi-wang Shu

1996

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Linearly implicit Runge–Kutta methods for advection–reaction–diffusion equations

Juan Carlos Novo

Applied Numerical Mathematics, 2001

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Rodolfo Bermejo

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Alexander Kurganov

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Lorenzo Pareschi

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Alexander Kurganov

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Giovanni Russo

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On the Artificial Compression Method for Second-Order Nonoscillatory Central Difference Schemes for Systems of Conservation Laws

Sebastian Noelle

SIAM Journal on Scientific Computing, 2003

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Fourth-order runge-kutta schemes for fluid mechanics applications

Veer Vatsa

Journal of Scientific Computing, 2005

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Non-Oscillatory Limited-Time Integration for Conservation Laws and Convection-Diffusion Equations

James Baeder

arXiv (Cornell University), 2022

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A Comparison Between Relaxation and Kurganov—Tadmor Schemes

Giovanni Naldi

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Mathematical Modelling and Numerical Analysis, 1999

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Total variation diminishing Runge-Kutta schemes

Sigal Gottlieb

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Second-order characteristic methods for advection–diffusion equations and comparison to other schemes

Robert C Sharpley

Advances in Water Resources, 1999

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Explicit solutions to a convection-reaction equation and defects of numerical schemes

Yong Jung Kim

Journal of Computational Physics, 2006

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On the uniform accuracy of IMEX Runge-Kutta schemes and applications to hyperbolic systems with relaxation

Sebastiano Boscarino

2007

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Central differencing based numerical schemes for hyperbolic conservation laws with relaxation terms

Lorenzo Pareschi

SIAM journal on numerical analysis, 2002

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Weakly Non-Oscillatory Schemes for Scalar Conservation Laws

Bojan Popov

Mathematics of Computation, 2001

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