Sigal Gottlieb
Cited by
Cited by
Total variation diminishing Runge-Kutta schemes
S Gottlieb, CW Shu
Mathematics of computation 67 (221), 73-85, 1998
Strong stability-preserving high-order time discretization methods
S Gottlieb, CW Shu, E Tadmor
SIAM review 43 (1), 89-112, 2001
Spectral methods for time-dependent problems
JS Hesthaven, S Gottlieb, D Gottlieb
Cambridge University Press, 2007
Strong stability preserving Runge-Kutta and multistep time discretizations
S Gottlieb, D Ketcheson, CW Shu
High order strong stability preserving time discretizations
S Gottlieb, DI Ketcheson, CW Shu
Journal of Scientific Computing 38 (3), 251-289, 2009
On high order strong stability preserving Runge-Kutta and multi step time discretizations
S Gottlieb
Journal of scientific computing 25, 105-128, 2005
Optimal implicit strong stability preserving Runge–Kutta methods
DI Ketcheson, CB Macdonald, S Gottlieb
Applied Numerical Mathematics 59 (2), 373-392, 2009
Stability and convergence analysis of fully discrete Fourier collocation spectral method for 3-D viscous Burgers’ equation
S Gottlieb, C Wang
Journal of Scientific Computing 53 (1), 102-128, 2012
Long time stability of a classical efficient scheme for two-dimensional Navier–Stokes equations
S Gottlieb, F Tone, C Wang, X Wang, D Wirosoetisno
SIAM Journal on Numerical Analysis 50 (1), 126-150, 2012
High order time discretization methods with the strong stability property
S Gottlieb, CW Shu, E Tadmor
Copyright: Society for Industrial and Applied Mathematics, 2001
A Fourier pseudospectral method for the “good” Boussinesq equation with second‐order temporal accuracy
K Cheng, W Feng, S Gottlieb, C Wang
Numerical Methods for Partial Differential Equations 31 (1), 202-224, 2015
Strong stability preserving properties of Runge–Kutta time discretization methods for linear constant coefficient operators
S Gottlieb, LAJ Gottlieb
Journal of Scientific Computing 18, 83-109, 2003
Strong stability preserving two-step Runge–Kutta methods
DI Ketcheson, S Gottlieb, CB Macdonald
SIAM Journal on Numerical Analysis 49 (6), 2618-2639, 2011
A review of David Gottlieb’s work on the resolution of the Gibbs phenomenon
S Gottlieb, JH Jung, S Kim
Communications in Computational Physics 9 (3), 497-519, 2011
Strong stability preserving integrating factor Runge--Kutta methods
L Isherwood, ZJ Grant, S Gottlieb
SIAM Journal on Numerical Analysis 56 (6), 3276-3307, 2018
Explicit strong stability preserving multistage two-derivative time-stepping schemes
AJ Christlieb, S Gottlieb, Z Grant, DC Seal
Journal of Scientific Computing 68, 914-942, 2016
A fifth order flux implicit WENO method
S Gottlieb, JS Mullen, SJ Ruuth
Journal of Scientific Computing 27 (1), 271-287, 2006
Optimal strong-stability-preserving time-stepping schemes with fast downwind spatial discretizations
S Gottlieb, SJ Ruuth
Journal of Scientific Computing 27, 289-303, 2006
Explicit strong stability preserving multistep Runge–Kutta methods
C Bresten, S Gottlieb, Z Grant, D Higgs, D Ketcheson, A Németh
Mathematics of Computation 86 (304), 747-769, 2017
Implicit and implicit–explicit strong stability preserving Runge–Kutta methods with high linear order
S Conde, S Gottlieb, ZJ Grant, JN Shadid
Journal of Scientific Computing 73, 667-690, 2017
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