Fully discrete potential-based finite element methods for a transient eddy current problem T Kang, KI Kim Computing 85 (4), 339-362, 2009 | 38 | 2009 |
A potential-based finite-element method for time-dependent Maxwell’s equations KI Kim, T Kang International Journal of Computer Mathematics 83 (1), 107-122, 2006 | 18 | 2006 |
Some A Posteriori Error Estimates of the Finite-Difference Streamline-Diffusion Method for Convection-Dominated Diffusion Equations T Kang, D Yu Advances in Computational Mathematics 15, 193-218, 2001 | 15 | 2001 |
Fully discrete A‐ϕ finite element method for Maxwell's equations with nonlinear conductivity T Kang, T Chen, H Zhang, K Ik Kim Numerical Methods for Partial Differential Equations 30 (6), 2083-2108, 2014 | 13 | 2014 |
Improved T− ψ nodal finite element schemes for eddy current problems T Kang, T Chen, H Zhang, KI Kim Applied Mathematics and Computation 218 (2), 287-302, 2011 | 13 | 2011 |
An E-based splitting finite element method for time-dependent eddy current equations T Kang, KI Kim, Z Wu Journal of computational and applied mathematics 196 (2), 358-367, 2006 | 13 | 2006 |
A (T,ψ)‐ψe decoupled scheme for a time‐dependent multiply‐connected eddy current problem T Chen, T Kang, G Lu, L Wu Mathematical Methods in the Applied Sciences 37 (3), 343-359, 2014 | 11 | 2014 |
On the coupled NBEM and FEM for a class of nonlinear exterior Dirichlet problem in R 2 Z Wu, T Kang, D Yu Science in China Series A: Mathematics 47, 181-189, 2004 | 9 | 2004 |
A T- ψ formulation with the penalty function term for the 3D eddy current problem in laminated structures T Kang, T Chen, Y Wang, KI Kim Applied Mathematics and Computation 271, 618-641, 2015 | 7 | 2015 |
A least squares based diamond scheme for 3D heterogeneous and anisotropic diffusion problems on polyhedral meshes C Dong, T Kang Applied Mathematics and Computation 418, 126847, 2022 | 6 | 2022 |
A T-ψ FINITE ELEMENT METHOD FOR A NONLINEAR DEGENERATE EDDY CURRENT MODEL WITH FERROMAGNETIC MATERIALS. T KANG, TAO CHEN International Journal of Numerical Analysis & Modeling 12 (4), 636-663, 2015 | 6 | 2015 |
An improved error estimate for Maxwell’s equations with a power-law nonlinear conductivity T Kang, Y Wang, L Wu, KI Kim Applied Mathematics Letters 45, 93-97, 2015 | 6 | 2015 |
A least squares based diamond scheme for anisotropic diffusion problems on polygonal meshes C Dong, T Kang International Journal for Numerical Methods in Fluids 93 (11), 3231-3253, 2021 | 4 | 2021 |
Fully Discrete A-ø Finite Element Method for Maxwell’s Equations with a Nonlinear Boundary Condition T Kang, R Wang, T Chen, H Zhang Numerical Mathematics: Theory, Methods and Applications 8 (4), 605-633, 2015 | 4 | 2015 |
A–ϕ finite element method with composite grids for time-dependent eddy current problem T Kang, T Chen, H Zhang, KI Kim Applied Mathematics and Computation 267, 365-381, 2015 | 4 | 2015 |
A Jacobian smoothing method for box constrained variational inequality problems C Ma, T Kang Applied mathematics and computation 162 (3), 1397-1429, 2005 | 4 | 2005 |
On equivalence of decomposition integrals based on different monotone measures T Kang, J Li Fuzzy Sets and Systems 457, 142-155, 2023 | 3 | 2023 |
Potential field formulation based on decomposition of the electric field for a nonlinear induction hardening model T Kang, R Wang, H Zhang Communications in Applied Mathematics and Computational Science 14 (2), 175-205, 2019 | 3 | 2019 |
The reconstruction of a time-dependent source from a surface measurement for full Maxwell’s equations by means of the potential field method T Kang, K Van Bockstal, R Wang Computers & Mathematics with Applications 75 (3), 764-786, 2018 | 3 | 2018 |
A posteriori error estimate of the DSD method for first-order hyperbolic equations K Tong, Y De-hao Applied Mathematics and Mechanics 23, 732-740, 2002 | 3 | 2002 |