# Search results for: Tong Kang

Biometrical Journal > 63 > 4 > 761 - 786

Statistics in Medicine > 40 > 6 > 1336 - 1356

Numerical Methods for Partial Differential Equations > 37 > 1 > 546 - 582

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*T**ψ*method is to transform Maxwell's equations to the vector–scalar potential formulations and to solve the potentials by means of the finite element method. In this...

Advanced Materials > 32 > 15 > n/a - n/a

Advanced Materials > 32 > 15 > n/a - n/a

Journal of Synchrotron Radiation > 26 > 6 > 2024 - 2032

Advanced Materials > 30 > 11 > n/a - n/a

Advanced Materials > 30 > 11 > n/a - n/a

Computational and Applied Mathematics > 2018 > 37 > 4 > 3981-3994

Computers & Mathematics with Applications > 2017 > 73 > 4 > 588-600

Statistical Methodology > 2016 > 33 > C > 55-70

Statistical Methodology > 2016 > 32 > C > 14-35

Statistical Methodology > 2016 > 32 > C > 218-235

Applied Mathematics and Computation > 2015 > 271 > C > 618-641

Applied Mathematics and Computation > 2015 > 267 > Complete > 365-381

Applied Mathematics Letters > 2015 > 45 > Complete > 93-97

Systematic and Applied Microbiology > 2014 > 37 > 7 > 525-532

Numerical Methods for Partial Differential Equations > 30 > 6 > 2083 - 2108

**‐$\varphi $ finite element method to solve nonlinear Maxwell's equations based on backward Euler discretization in time and nodal finite elements in space. The nonlinearity is owing to a field‐dependent conductivity with the power‐law form $|E{|}^{\alpha -1},0<\alpha <1$. We design a nonlinear time‐discrete scheme for approximation in suitable function spaces...**

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