Global existence and large-time behavior of solutions to the three-dimensional equations of compressible magnetohydrodynamic flows X Hu, D Wang Archive for Rational Mechanics and Analysis 197 (1), 203-238, 2010 | 322 | 2010 |
Global solutions to the three-dimensional full compressible magnetohydrodynamic flows X Hu, D Wang Communications in mathematical physics 283, 255-284, 2008 | 247 | 2008 |
Low Mach number limit of viscous compressible magnetohydrodynamic flows X Hu, D Wang SIAM journal on mathematical analysis 41 (3), 1272-1294, 2009 | 143 | 2009 |
Global existence for the multi-dimensional compressible viscoelastic flows X Hu, D Wang Journal of Differential Equations 250 (2), 1200-1231, 2011 | 111 | 2011 |
Global existence and optimal decay rates for three-dimensional compressible viscoelastic flows X Hu, G Wu SIAM Journal on Mathematical Analysis 45 (5), 2815-2833, 2013 | 88 | 2013 |
Local strong solution to the compressible viscoelastic flow with large data X Hu, D Wang Journal of Differential Equations 249 (5), 1179-1198, 2010 | 84 | 2010 |
Global solution to the three-dimensional incompressible flow of liquid crystals X Hu, D Wang Communications in Mathematical Physics 296, 861-880, 2010 | 78 | 2010 |
Global existence for two dimensional compressible magnetohydrodynamic flows with zero magnetic diffusivity X Hu arXiv preprint arXiv:1405.0274, 2014 | 77 | 2014 |
Global solutions of two‐dimensional incompressible viscoelastic flows with discontinuous initial data X Hu, F Lin Communications on Pure and Applied Mathematics 69 (2), 372-404, 2016 | 69 | 2016 |
Global solution to the three-dimensional compressible flow of liquid crystals X Hu, H Wu SIAM Journal on Mathematical Analysis 45 (5), 2678-2699, 2013 | 54 | 2013 |
Compactness of weak solutions to the three-dimensional compressible magnetohydrodynamic equations X Hu, D Wang Journal of Differential Equations 245 (8), 2176-2198, 2008 | 54 | 2008 |
Long-time behavior and weak-strong uniqueness for incompressible viscoelastic flows X Hu, H Wu arXiv preprint arXiv:1411.0518, 2014 | 35 | 2014 |
Strong solutions to the three-dimensional compressible viscoelastic fluids X Hu, D Wang Journal of Differential Equations 252 (6), 4027-4067, 2012 | 35 | 2012 |
The initial-boundary value problem for the compressible viscoelastic flows X Hu, D Wang Discrete and Continuous Dynamical Systems 35 (3), 917-934, 2014 | 29 | 2014 |
A blowup criterion for ideal viscoelastic flow X Hu, R Hynd arXiv preprint arXiv:1102.1113, 2011 | 25 | 2011 |
Suitable weak solutions for the co-rotational Beris–Edwards system in dimension three H Du, X Hu, C Wang Archive for Rational Mechanics and Analysis 238 (2), 749-803, 2020 | 23 | 2020 |
Global existence of weak solutions to two dimensional compressible viscoelastic flows X Hu Journal of Differential Equations 265 (7), 3130-3167, 2018 | 21 | 2018 |
Formation of singularity for compressible viscoelasticity X Hu, D Wang Acta Mathematica Scientia 32 (1), 109-128, 2012 | 18 | 2012 |
Global existence for the compressible viscoelastic system with zero shear viscosity in three dimensions X Hu, W Zhao Journal of Differential Equations 268 (4), 1658-1685, 2020 | 16 | 2020 |
Equations for viscoelastic fluids X Hu, FH Lin, C Liu Handbook of mathematical analysis in mechanics of viscous fluids, 1045-1073, 2018 | 16 | 2018 |