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David C. Seal
David C. Seal
Rocket Software
Verified email at rocketsoftware.com - Homepage
Title
Cited by
Cited by
Year
A positivity-preserving high-order semi-Lagrangian discontinuous Galerkin scheme for the Vlasov–Poisson equations
JA Rossmanith, DC Seal
Journal of Computational Physics 230 (16), 6203-6232, 2011
1992011
High-order multiderivative time integrators for hyperbolic conservation laws
DC Seal, Y Güçlü, AJ Christlieb
Journal of Scientific Computing 60, 101-140, 2014
752014
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
A high-order positivity-preserving single-stage single-step method for the ideal magnetohydrodynamic equations
AJ Christlieb, X Feng, DC Seal, Q Tang
http://arxiv.org/abs/1509.09208, 2015
352015
An explicit high-order single-stage single-step positivity-preserving finite difference WENO method for the compressible Euler equations
DC Seal, Q Tang, Z Xu, AJ Christlieb
http://arxiv.org/abs/1411.0328, 2014
302014
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
Positivity-preserving discontinuous Galerkin methods with Lax–Wendroff time discretizations
SA Moe, JA Rossmanith, DC Seal
Journal of Scientific Computing 71, 44-70, 2017
262017
Method of Lines Transpose: High Order L-Stable Schemes for Parabolic Equations Using Successive Convolution
MF Causley, H Cho, AJ Christlieb, DC Seal
SIAM Journal on Numerical Analysis 54 (3), 1635-1652, 2016
262016
On the convergence of spectral deferred correction methods
M Causley, D Seal
Communications in Applied Mathematics and Computational Science 14 (1), 33-64, 2019
232019
A simple and effective high-order shock-capturing limiter for discontinuous Galerkin methods
SA Moe, JA Rossmanith, DC Seal
arXiv preprint arXiv:1507.03024, 2015
202015
The Picard integral formulation of weighted essentially nonoscillatory schemes
AJ Christlieb, Y Guclu, DC Seal
SIAM Journal on Numerical Analysis 53 (4), 1833-1856, 2015
18*2015
Implicit multiderivative collocation solvers for linear partial differential equations with discontinuous Galerkin spatial discretizations
J Schütz, DC Seal, A Jaust
Journal of Scientific Computing 73, 1145-1163, 2017
172017
Discontinuous Galerkin methods for Vlasov models of plasma
DC Seal
Ph. D. Thesis, 2012
152012
An asymptotic preserving semi-implicit multiderivative solver
J Schütz, DC Seal
Applied Numerical Mathematics 160, 84-101, 2021
122021
Implicit multistage two-derivative discontinuous Galerkin schemes for viscous conservation laws
A Jaust, J Schütz, DC Seal
Journal of Scientific Computing 69, 866-891, 2016
122016
Stability of implicit multiderivative deferred correction methods
J Zeifang, J Schütz, DC Seal
BIT Numerical Mathematics 62 (4), 1487-1503, 2022
82022
Parallel-in-time high-order multiderivative IMEX solvers
J Schütz, DC Seal, J Zeifang
Journal of Scientific Computing 90 (1), 54, 2022
82022
An explicitness-preserving IMEX-split multiderivative method
E Theodosiou, J Schütz, D Seal
Computers & Mathematics with Applications 158, 139-149, 2024
22024
Multiderivative time-integrators for the hybridized discontinuous Galerkin method
A Jaust, J Schütz, D Seal
Proceedings to YIC GACM 2015, 2015
22015
Erratum to: Explicit Strong Stability Preserving Multistage Two-Derivative Time-Stepping Schemes
AJ Christlieb, S Gottlieb, Z Grant, DC Seal
Journal of Scientific Computing 68, 943-944, 2016
2016
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