Numerical approximations of Allen-Cahn and Cahn-Hilliard equations J Shen, X Yang Discrete Contin. Dyn. Syst 28 (4), 1669-1691, 2010 | 890 | 2010 |
Linear, first and second-order, unconditionally energy stable numerical schemes for the phase field model of homopolymer blends X Yang Journal of Computational Physics 327, 294-316, 2016 | 407 | 2016 |
A phase-field model and its numerical approximation for two-phase incompressible flows with different densities and viscosities J Shen, X Yang SIAM Journal on Scientific Computing 32 (3), 1159-1179, 2010 | 356 | 2010 |
Numerical simulations of jet pinching-off and drop formation using an energetic variational phase-field method X Yang, JJ Feng, C Liu, J Shen Journal of Computational Physics 218 (1), 417-428, 2006 | 275 | 2006 |
Numerical approximations for the molecular beam epitaxial growth model based on the invariant energy quadratization method X Yang, J Zhao, Q Wang Journal of Computational Physics 333, 104-127, 2017 | 261 | 2017 |
Decoupled, energy stable schemes for phase-field models of two-phase incompressible flows J Shen, X Yang SIAM Journal on Numerical Analysis 53 (1), 279-296, 2015 | 254 | 2015 |
Numerical approximations for a three-component Cahn–Hilliard phase-field model based on the invariant energy quadratization method X Yang, J Zhao, Q Wang, J Shen Mathematical Models and Methods in Applied Sciences 27 (11), 1993-2030, 2017 | 216 | 2017 |
Efficient linear schemes with unconditional energy stability for the phase field elastic bending energy model X Yang, L Ju Computer Methods in Applied Mechanics and Engineering 315, 691-712, 2017 | 203 | 2017 |
Numerical approximations for a phase field dendritic crystal growth model based on the invariant energy quadratization approach J Zhao, Q Wang, X Yang International Journal for Numerical Methods in Engineering 110 (3), 279-300, 2017 | 194 | 2017 |
Linearly first-and second-order, unconditionally energy stable schemes for the phase field crystal model X Yang, D Han Journal of Computational Physics 330, 1116-1134, 2017 | 172 | 2017 |
Linear and unconditionally energy stable schemes for the binary fluid–surfactant phase field model X Yang, L Ju Computer Methods in Applied Mechanics and Engineering 318, 1005-1029, 2017 | 154 | 2017 |
Energy stable schemes for Cahn-Hilliard phase-field model of two-phase incompressible flows J Shen, X Yang Chinese Annals of Mathematics, Series B 31 (5), 743-758, 2010 | 151 | 2010 |
Error analysis of stabilized semi-implicit method of Allen-Cahn equation X Yang Discrete Contin. Dyn. Syst. Ser. B 11 (4), 1057-1070, 2009 | 134 | 2009 |
A novel linear second order unconditionally energy stable scheme for a hydrodynamic Q-tensor model of liquid crystals J Zhao, X Yang, Y Gong, Q Wang Computer Methods in Applied Mechanics and Engineering 318, 803-825, 2017 | 131 | 2017 |
Decoupled energy stable schemes for phase-field models of two-phase complex fluids J Shen, X Yang SIAM Journal on Scientific Computing 36 (1), B122-B145, 2014 | 120 | 2014 |
Efficient energy stable numerical schemes for a phase field moving contact line model J Shen, X Yang, H Yu Journal of Computational Physics 284, 617-630, 2015 | 119 | 2015 |
Decoupled energy stable schemes for a phase-field model of two-phase incompressible flows with variable density C Liu, J Shen, X Yang Journal of Scientific Computing 62, 601-622, 2015 | 115 | 2015 |
An efficient moving mesh spectral method for the phase-field model of two-phase flows J Shen, X Yang Journal of computational physics 228 (8), 2978-2992, 2009 | 115 | 2009 |
Fast, provably unconditionally energy stable, and second-order accurate algorithms for the anisotropic Cahn–Hilliard model C Chen, X Yang Computer Methods in Applied Mechanics and Engineering 351, 35-59, 2019 | 107 | 2019 |
Three dimensional phase-field investigation of droplet formation in microfluidic flow focusing devices with experimental validation F Bai, X He, X Yang, R Zhou, C Wang International Journal of Multiphase Flow 93, 130-141, 2017 | 106 | 2017 |