A convergent convex splitting scheme for the periodic nonlocal Cahn-Hilliard equation Z Guan, C Wang, SM Wise Numerische Mathematik 128, 377-406, 2014 | 130 | 2014 |
A diffuse domain method for two-phase flows with large density ratio in complex geometries Z Guo, F Yu, P Lin, S Wise, J Lowengrub Journal of Fluid Mechanics 907, A38, 2021 | 32 | 2021 |
A fluid model of cancer progression and treatment S Wise, V Cristini, J Lowengrub, X Zheng APS Division of Fluid Dynamics Meeting Abstracts 56, KE. 004, 2003 | | 2003 |
A linear energy stable scheme for a thin film model without slope selection W Chen, S Conde, C Wang, X Wang, SM Wise Journal of Scientific Computing 52 (3), 546-562, 2012 | 160 | 2012 |
A linear iteration algorithm for a second-order energy stable scheme for a thin film model without slope selection W Chen, C Wang, X Wang, SM Wise Journal of Scientific Computing 59, 574-601, 2014 | 110 | 2014 |
A mass-conservative adaptive FAS multigrid solver for cell-centered finite difference methods on block-structured, locally-cartesian grids W Feng, Z Guo, JS Lowengrub, SM Wise Journal of Computational Physics 352, 463-497, 2018 | 23 | 2018 |
A MIXED DISCONTINUOUS GALERKIN, CONVEX SPLITTING SCHEME FOR A MODIFIED CAHN-HILLIARD EQUATION AND AN EFFICIENT NONLINEAR MULTIGRID SOLVER. AC Aristotelous, O Karakashian, SM Wise Discrete & Continuous Dynamical Systems-Series B 18 (9), 2013 | 91 | 2013 |
A modified Crank-Nicolson scheme for the Flory-Huggins Cahn-Hilliard model W Chen, J Jing, C Wang, X Wang, S Wise Communications in computational physics, 2022 | 19 | 2022 |
A new method for simulating strongly anisotropic Cahn-Hilliard equations S Torabi, S Wise, J Lowengrub, A Ratz, A Voigt MATERIALS SCIENCE AND TECHNOLOGY-ASSOCIATION FOR IRON AND STEEL TECHNOLOGY …, 2007 | 11 | 2007 |
A new phase-field model for strongly anisotropic S Torabi, J Lowengrub, A Voigt, S Wise | | 2009 |
A new phase-field model for strongly anisotropic systems S Torabi, J Lowengrub, A Voigt, S Wise Proceedings of the Royal Society A: Mathematical, Physical and Engineering …, 2009 | 225 | 2009 |
A positivity-preserving, energy stable and convergent numerical scheme for the Poisson-Nernst-Planck system C Liu, C Wang, S Wise, X Yue, S Zhou Mathematics of Computation 90 (331), 2071-2106, 2021 | 72 | 2021 |
A positivity-preserving, energy stable scheme for a ternary Cahn-Hilliard system with the singular interfacial parameters L Dong, C Wang, SM Wise, Z Zhang Journal of Computational Physics 442, 110451, 2021 | 59 | 2021 |
A preconditioned steepest descent solver for the Cahn-Hilliard equation with variable mobility X Chen, C Wang, S Wise International journal of numerical analysis and modeling 19 (6), 2022 | 4 | 2022 |
A Progress Report on Numerical Methods for BGK-Type Kinetic Equations E Habbershaw, SM Wise | 1 | 2022 |
A second order accurate in time, energy stable finite element scheme for the Flory-Huggins-Cahn-Hilliard equation M Yuan, W Chen, C Wang, S Wise, Z Zhang Advances in applied mathematics and mechanics, 2022 | 21 | 2022 |
A second order accurate numerical method for the Poisson-Nernst-Planck system in the energetic variational formulation C Liu, C Wang, SM Wise, X Yue, S Zhou arXiv preprint arXiv:2208.06123, 2022 | 7 | 2022 |
A second order accurate, positivity preserving numerical method for the Poisson–Nernst–Planck system and its convergence analysis C Liu, C Wang, SM Wise, X Yue, S Zhou Journal of Scientific Computing 97 (1), 23, 2023 | 5 | 2023 |
A second order energy stable scheme for the Cahn-Hilliard-Hele-Shaw equations W Chen, W Feng, Y Liu, C Wang, SM Wise arXiv preprint arXiv:1611.02967, 2016 | 87 | 2016 |
A second-order energy stable BDF numerical scheme for the Cahn-Hilliard equation Y Yan, W Chen, C Wang, SM Wise Commun. Comput. Phys. 23 (2), 572-602, 2018 | 174 | 2018 |