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Zachary J. Grant
Zachary J. Grant
Post Doctoral Researcher
Verified email at msu.edu
Title
Cited by
Cited by
Year
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
492016
Strong stability preserving integrating factor Runge--Kutta methods
L Isherwood, ZJ Grant, S Gottlieb
SIAM Journal on Numerical Analysis 56 (6), 3276-3307, 2018
482018
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
412017
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
402017
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
262019
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
202019
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
172022
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
122023
Optimal explicit strong stability preserving Runge–Kutta methods with high linear order and optimal nonlinear order
S Gottlieb, Z Grant, D Higgs
Mathematics of Computation 84 (296), 2743-2761, 2015
122015
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
112022
RK-Opt: A package for the design of numerical ODE solvers
DI Ketcheson, M Parsani, Z Grant, A Ahmadia, H Ranocha
The Open Journal, 2020
82020
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
8*2020
Perturbed Runge–Kutta methods for mixed precision applications
ZJ Grant
Journal of Scientific Computing 92 (1), 6, 2022
62022
Downwinding for preserving strong stability in explicit integrating factor Runge–Kutta methods
Leah Isherwood, Sigal Gottlieb, Zachary J. Grant
Pure and Applied Mathematics Quarterly 14 (1), Pages: 3 – 25, 2019
6*2019
Strong stability preserving sixth order two-derivative Runge–Kutta methods
GF Reynoso, S Gottlieb, ZJ Grant
AIP Conference Proceedings 1863 (1), 2017
62017
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
52021
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
5*2021
Explicit and implicit error inhibiting schemes with post-processing
A Ditkowski, S Gottlieb, ZJ Grant
Computers & Fluids 208, 104534, 2020
52020
Stability Analysis and Performance Evaluation of Additive Mixed-Precision Runge-Kutta Methods
B Burnett, S Gottlieb, ZJ Grant
Communications on Applied Mathematics and Computation 6 (1), 705-738, 2024
2024
Stability Analysis and Performance Evaluation of Mixed-Precision Runge-Kutta Methods
B Burnett, S Gottlieb, ZJ Grant
arXiv preprint arXiv:2212.11849, 2022
2022
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