Paul Zegeling
Paul Zegeling
Department of Mathematics, Utrecht University
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TitleCited byYear
Pattern formation in the one-dimensional Gray-Scott model
A Doelman, TJ Kaper, PA Zegeling
Nonlinearity 10 (2), 523, 1997
A numerical study of three moving-grid methods for one-dimensional partial differential equations which are based on the method of lines
RM Furzeland, JG Verwer, PA Zegeling
Journal of Computational Physics 89 (2), 349-388, 1990
Algorithm 731: a moving-grid interface for systems of one-dimensional time-dependent partial differential equations
JG Blom, PA Zegeling
ACM Transactions on Mathematical Software (TOMS) 20 (2), 194-214, 1994
Can a species keep pace with a shifting climate?
H Berestycki, O Diekmann, CJ Nagelkerke, PA Zegeling
Bulletin of mathematical biology 71 (2), 399, 2009
A moving grid method for one-dimensional PDEs based on the method of lines
JG Verwer, JG Blom, RM Furzeland, PA Zegeling
Society for Industrial & Applied Mathematics, SIAM (Philadelphia, PA), 1989
Adaptive moving mesh computations for reaction–diffusion systems
PA Zegeling, HP Kok
Journal of Computational and Applied Mathematics 168 (1-2), 519-528, 2004
A robust moving mesh finite volume method applied to 1D hyperbolic conservation laws from magnetohydrodynamics
A van Dam, PA Zegeling
Journal of Computational Physics 216 (2), 526-546, 2006
Moving-grid methods for time-dependent partial differential equations
PA Zegeling
CWI (Centre for Mathematics and Computer Science), 1993
Method of lines study of nonlinear dispersive waves
P Saucez, AV Wouwer, WE Schiesser, P Zegeling
Journal of Computational and Applied Mathematics 168 (1-2), 413-423, 2004
Application of a moving grid method to a class of 1D brine transport problems in porous media
PA Zegeling, JG Verwer, JCH Van Eijkeren
International Journal for Numerical Methods in Fluids 15 (2), 175-191, 1992
Numerical solutions of a generalized theory for macroscopic capillarity
F Doster, PA Zegeling, R Hilfer
Physical Review E 81 (3), 036307, 2010
Balanced monitoring of flow phenomena in moving mesh methods
A van Dam, PA Zegeling
Communications in Computational Physics 7 (1), 138-170, 2010
Moving grid techniques
PA Zegeling
Handbook of Grid Generation, 37, 1999
On resistive MHD models with adaptive moving meshes
PA Zegeling
Journal of Scientific Computing 24 (2), 263-284, 2005
Robust and efficient adaptive moving mesh solution of the 2-D Euler equations
PA Zegeling, WD De Boer, HZ Tang
Contemporary Mathematics 383, 375, 2005
Solitary waves in nonlinear beam equations: stability, fission and fusion
AR Champneys, PJ McKenna, PA Zegeling
Nonlinear Dynamics 21 (1), 31-53, 2000
An evaluation of the gradient-weighted moving-finite-element method in one space dimension
PA Zegeling, JG Blom
Journal of Computational Physics 103 (2), 422-441, 1992
r-refinement for evolutionary PDEs with finite elements or finite differences
PA Zegeling
Applied Numerical Mathematics 26 (1-2), 97-104, 1998
Adaptive method of lines solutions for the extended fifth-order Korteweg–de Vries equation
P Saucez, AV Wouwer, PA Zegeling
Journal of computational and applied mathematics 183 (2), 343-357, 2005
A note on the grid movement induced by MFE
PA Zegeling, JG Blom
International journal for numerical methods in engineering 35 (3), 623-636, 1992
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