Articles with public access mandates - Sigal GottliebLearn more
Not available anywhere: 1
Two-derivative error inhibiting schemes and enhanced error inhibiting schemes
A Ditkowski, S Gottlieb, ZJ Grant
SIAM Journal on Numerical Analysis 58 (6), 3197-3225, 2020
Mandates: US Department of Energy, US Department of Defense
Available somewhere: 18
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
Mandates: National Natural Science Foundation of China
Strong stability preserving integrating factor Runge--Kutta methods
L Isherwood, ZJ Grant, S Gottlieb
SIAM Journal on Numerical Analysis 56 (6), 3276-3307, 2018
Mandates: US Department of Defense
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
Mandates: US National Science Foundation, US National Aeronautics and Space Administration
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
Mandates: US Department of Energy, US Department of Defense
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
Mandates: US Department of Defense
A strong stability preserving analysis for explicit multistage two-derivative time-stepping schemes based on Taylor series conditions
Z Grant, S Gottlieb, DC Seal
Communications on Applied Mathematics and Computation 1, 21-59, 2019
Mandates: US Department of Energy, US Department of Defense
A reduced radial basis function method for partial differential equations on irregular domains
Y Chen, S Gottlieb, A Heryudono, A Narayan
Journal of Scientific Computing 66 (1), 67-90, 2016
Mandates: US National Science Foundation
High Order Strong Stability Preserving MultiDerivative Implicit and IMEX Runge--Kutta Methods with Asymptotic Preserving Properties
S Gottlieb, ZJ Grant, J Hu, R Shu
SIAM Journal on Numerical Analysis 60 (1), 423-449, 2022
Mandates: US National Science Foundation, US Department of Energy, US Department of …
An EIM-degradation free reduced basis method via over collocation and residual hyper reduction-based error estimation
Y Chen, S Gottlieb, L Ji, Y Maday
Journal of Computational Physics 444, 110545, 2021
Mandates: US National Science Foundation, US Department of Defense, National Natural …
Strong stability preserving integrating factor two-step Runge–Kutta methods
L Isherwood, ZJ Grant, S Gottlieb
Journal of Scientific Computing 81 (3), 1446-1471, 2019
Mandates: US Department of Energy, US Department of Defense
A GPU-accelerated mixed-precision WENO method for extremal black hole and gravitational wave physics computations
SE Field, S Gottlieb, ZJ Grant, LF Isherwood, G Khanna
Communications on Applied Mathematics and Computation 5 (1), 97-115, 2023
Mandates: US National Science Foundation, US Department of Energy, US Department of …
A general linear method approach to the design and optimization of efficient, accurate, and easily implemented time-stepping methods in CFD
V DeCaria, S Gottlieb, ZJ Grant, WJ Layton
Journal of Computational Physics 455, 110927, 2022
Mandates: US National Science Foundation, US Department of Energy, US Department of …
Error inhibiting block one-step schemes for ordinary differential equations
A Ditkowski, S Gottlieb
Journal of Scientific Computing 73, 691-711, 2017
Mandates: US Department of Defense
Performance evaluation of mixed-precision Runge-Kutta methods
B Burnett, S Gottlieb, ZJ Grant, A Heryudono
2021 IEEE High Performance Extreme Computing Conference (HPEC), 1-6, 2021
Mandates: US Department of Energy, US Department of Defense
Explicit and implicit error inhibiting schemes with post-processing
A Ditkowski, S Gottlieb, ZJ Grant
Computers & Fluids 208, 104534, 2020
Mandates: US Department of Energy, US Department of Defense
High order unconditionally strong stability preserving multi-derivative implicit and IMEX Runge–Kutta methods with asymptotic preserving properties
S Gottlieb, ZJ Grant, J Hu, R Shu
arXiv preprint arXiv:2102.11939, 2021
Mandates: US Department of Defense
Discontinuous Galerkin method for linear wave equations involving derivatives of the Dirac delta distribution
SE Field, S Gottlieb, G Khanna, E McClain
Spectral and High Order Methods for Partial Differential Equations ICOSAHOM …, 2022
Mandates: US National Science Foundation, US Department of Defense
Preface to the Special Issue in Memory of Professor Saul Abarbanel
A Chertock, A Ditkowski, A Gelb, S Gottlieb, S Tsynkov
Journal of Scientific Computing 81 (3), 1119-1123, 2019
Mandates: US National Science Foundation, US Department of Defense
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