Elliptic partial differential equations Q Han, F Lin American Mathematical Soc., 2011 | 1001 | 2011 |

Nonparabolic dissipative systems modeling the flow of liquid crystals FH Lin, C Liu Communications on Pure and Applied Mathematics 48 (5), 501-537, 1995 | 669 | 1995 |

A new proof of the Caffarelli‐Kohn‐Nirenberg theorem F Lin Communications on Pure and Applied Mathematics: A Journal Issued by the …, 1998 | 581 | 1998 |

Monotonicity properties of variational integrals, A p weights and unique continuation N Garofalo, FH Lin Indiana University Mathematics Journal 35 (2), 245-268, 1986 | 512 | 1986 |

On hydrodynamics of viscoelastic fluids FH Lin, C Liu, P Zhang Communications on Pure and Applied Mathematics 58 (11), 1437-1471, 2005 | 435 | 2005 |

Nonlinear theory of defects in nematic liquid crystals; phase transition and flow phenomena FH Lin Communications on Pure and Applied Mathematics 42 (6), 789-814, 1989 | 419 | 1989 |

Compactness methods in the theory of homogenization M Avellaneda, FH Lin Communications on Pure and Applied Mathematics 40 (6), 803-847, 1987 | 403 | 1987 |

Mappings minimizing the *L*^{p} norm of the gradientR Hardt, FH Lin Communications on Pure and Applied Mathematics 40 (5), 555-588, 1987 | 391 | 1987 |

Existence and partial regularity of static liquid crystal configurations R Hardt, D Kinderlehrer, FH Lin Communications in mathematical physics 105, 547-570, 1986 | 391 | 1986 |

Unique continuation for elliptic operators: a geometric‐variational approach N Garofalo, FH Lin Communications on pure and applied mathematics 40 (3), 347-366, 1987 | 380 | 1987 |

Liquid crystal flows in two dimensions F Lin, J Lin, C Wang Archive for Rational Mechanics and Analysis 197 (1), 297-336, 2010 | 348 | 2010 |

Partial regularity of the dynamic system modeling the flow of liquid crystals F Lin, C Liu Carnegie Mellon University, 1995 | 325 | 1995 |

Existence of solutions for the Ericksen-Leslie system FH Lin, C Liu Archive for rational mechanics and analysis 154, 135-156, 2000 | 299 | 2000 |

The analysis of harmonic maps and their heat flows F Lin, C Wang World Scientific, 2008 | 291 | 2008 |

Nodal sets of solutions of elliptic and parabolic equations FH Lin Communications on Pure and Applied Mathematics 44 (3), 287-308, 1991 | 289 | 1991 |

Global small solutions of 2-D incompressible MHD system F Lin, L Xu, P Zhang Journal of Differential Equations 259 (10), 5440-5485, 2015 | 262 | 2015 |

Some dynamical properties of Ginzburg-Landau vortices FH Lin Communications on pure and applied mathematics 49 (4), 323-360, 1996 | 237* | 1996 |

Geometric measure theory: an introduction FH Lin, X Yang Science Press, 2002 | 202 | 2002 |

Global small solutions to an MHD‐type system: the three‐dimensional case F Lin, P Zhang Communications on Pure and Applied Mathematics 67 (4), 531-580, 2014 | 191 | 2014 |

Gradient estimates and blow-up analysis for stationary harmonic maps FH Lin Annals of mathematics, 785-829, 1999 | 190 | 1999 |