Liquid crystal flows in two dimensions F Lin, J Lin, C Wang Archive for Rational Mechanics and Analysis 197 (1), 297-336, 2010 | 336 | 2010 |

The analysis of harmonic maps and their heat flows F Lin, C Wang World Scientific, 2008 | 264 | 2008 |

Well-posedness for the heat flow of harmonic maps and the liquid crystal flow with rough initial data C Wang Archive for rational mechanics and analysis 200 (1), 1-19, 2011 | 157 | 2011 |

On the uniqueness of heat flow of harmonic maps and hydrodynamic flow of nematic liquid crystals F Lin, C Wang Chinese Annals of Mathematics, Series B 31, 921-938, 2010 | 153 | 2010 |

Global existence of weak solutions of the nematic liquid crystal flow in dimension three F Lin, C Wang Communications on Pure and Applied Mathematics 69 (8), 1532-1571, 2016 | 150 | 2016 |

The Euler equation and absolute minimizers of L^∞ functionals EN Barron, RR Jensen, CY Wang Archive for rational mechanics and analysis 157 (4), 255-284, 2001 | 146 | 2001 |

Strong solutions of the compressible nematic liquid crystal flow T Huang, C Wang, H Wen Journal of Differential Equations 252 (3), 2222-2265, 2012 | 129 | 2012 |

Recent developments of analysis for hydrodynamic flow of nematic liquid crystals F Lin, C Wang Philosophical Transactions of the Royal Society A: Mathematical, Physical …, 2014 | 123 | 2014 |

Energy identity of harmonic map flows from surfaces at finite singular time F Lin, C Wang Calculus of Variations and Partial Differential Equations 6, 369-380, 1998 | 116 | 1998 |

Lower semicontinuity of L∞ functionals EN Barron, RR Jensen, CY Wang Annales de l'Institut Henri Poincaré C, Analyse non linéaire 18 (4), 495-517, 2001 | 110 | 2001 |

Biharmonic maps from *R* ^{ 4 } into a Riemannian manifoldC Wang Mathematische Zeitschrift 247, 65-87, 2004 | 109 | 2004 |

Blow up criterion for compressible nematic liquid crystal flows in dimension three T Huang, C Wang, H Wen Archive for rational mechanics and analysis 204, 285-311, 2012 | 102 | 2012 |

Blow up criterion for nematic liquid crystal flows T Huang, C Wang Communications in Partial Differential Equations 37 (5), 875-884, 2012 | 97 | 2012 |

Regularity and Existence of Global Solutions to the Ericksen–Leslie System in J Huang, F Lin, C Wang Communications in Mathematical Physics 331, 805-850, 2014 | 91 | 2014 |

Harmonic and quasi-harmonic spheres FH Lin, CY Wang Communications in Analysis and Geometry 7 (2), 397-429, 1999 | 88 | 1999 |

Stationary biharmonic maps from *R*^{m} into a Riemannian manifoldC Wang Communications on pure and applied mathematics 57 (4), 419-444, 2004 | 81 | 2004 |

Remarks on biharmonic maps into spheres C Wang Calculus of Variations and Partial Differential Equations 21 (3), 221-242, 2004 | 77 | 2004 |

Harmonic and quasi-harmonic spheres, Part II FH Lin, CY Wang Communications in Analysis and Geometry 10 (2), 341-375, 2002 | 76* | 2002 |

SEQUENCES FROM SURFACES TO GENERAL TARGETS C Wang Houston Journal of Mathematics 22 (3), 1996 | 72 | 1996 |

Well-posedness of nematic liquid crystal flow in JL Hineman, C Wang Archive for Rational Mechanics and Analysis 210 (1), 177-218, 2013 | 68 | 2013 |