Inviscid limits for the Navier–Stokes equations with Navier friction boundary conditions D Iftimie, G Planas Nonlinearity 19 (4), 899, 2006 | 118 | 2006 |

On the inviscid limit for two-dimensional incompressible flow with Navier friction condition MC Lopes Filho, HJN Lopes, G Planas SIAM journal on mathematical analysis 36, 1130, 2005 | 116 | 2005 |

Mild solutions to the time fractional Navier–Stokes equations in RN PM de Carvalho-Neto, G Planas Journal of Differential Equations 259 (7), 2948–2980, 2015 | 84 | 2015 |

Asymptotic behaviour of two-dimensional time-delayed Navier-Stokes equations G Planas, E Hernández Discrete & Continuous Dynamical Systems-A 21 (4), 1245, 2008 | 29 | 2008 |

On the “viscous incompressible fluid+ rigid body” system with Navier conditions G Planas, F Sueur Annales de l'Institut Henri Poincare (C) Non Linear Analysis 31 (1), 55-80, 2014 | 23 | 2014 |

A bidimensional phase-field model with convection for change phase of an alloy G Planas, JL Boldrini Journal of mathematical analysis and applications 303 (2), 669-687, 2005 | 23 | 2005 |

ATTRACTORS FOR A DOUBLE TIME-DELAYED 2D-NAVIER-STOKES MODEL J Garcıa-Luengo, P Marın-Rubio, G Planas Discrete and Continuous Dynamical Systems 34 (10), 4085-4105, 2014 | 22 | 2014 |

Asymptotic behaviour of a phase-field model with three coupled equations without uniqueness P Marín-Rubio, G Planas, J Real Journal of Differential Equations 246 (12), 4632-4652, 2009 | 20 | 2009 |

A tridimensional phase-field model with convection for phase change of an alloy JL Boldrini, G Planas Discrete & Continuous Dynamical Systems-A 13 (2), 429, 2005 | 18 | 2005 |

On a class of three dimensional Navier-Stokes equations with bounded delay SM Guzzo, G Planas Discrete & Continuous Dynamical Systems-B 16 (1), 225, 2011 | 17 | 2011 |

Weak solutions of a phase‐field model for phase change of an alloy with thermal properties JL Boldrini, G Planas Mathematical methods in the applied sciences 25 (14), 1177-1193, 2002 | 16 | 2002 |

On the Nonhomogeneous Navier--Stokes System with Navier Friction Boundary Conditions LCF Ferreira, G Planas, EJ Villamizar-Roa SIAM Journal on Mathematical Analysis 45 (4), 2576-2595, 2013 | 14 | 2013 |

Decay of solutions to dissipative modified quasi-geostrophic equations L Ferreira, C Niche, G Planas Proceedings of the American Mathematical Society 145 (1), 287-301, 2017 | 11 | 2017 |

Existence of solutions for a class of Navier–Stokes equations with infinite delay SM Guzzo, G Planas Applicable Analysis 94 (4), 840-855, 2015 | 11 | 2015 |

Weak Solutions of a Phase-Field Model with Convection for Solidification of an Alloy G Planas, J Boldrini COMMUNICATIONS IN APPLIED ANALYSIS 8 (4), 503-532, 2004 | 9 | 2004 |

Existence and fractional regularity of solutions for a doubly nonlinear differential inclusion JL Boldrini, LH de Miranda, G Planas Journal of Evolution Equations 13 (3), 535-560, 2013 | 8 | 2013 |

Existence and decay of solutions to the dissipative quasi-geostrophic equation with delays CJ Niche, G Planas Nonlinear Analysis: Theory, Methods & Applications 75 (9), 3936-3950, 2012 | 8 | 2012 |

On singular Navier-Stokes Equations and irreversible phase transitions JL Boldrini, LH De Miranda, G Planas Communications On Pure And Applied Analysis, 2012 | 8 | 2012 |

Global attractor and omega-limit sets structure for a phase-field model of thermal alloys P Marín-Rubio, G Planas Nonlinear Analysis: Real World Applications 13 (4), 1676-1691, 2012 | 7 | 2012 |

Existence and decay of solutions in full space to Navier–Stokes equations with delays CJ Niche, G Planas Nonlinear Analysis: Theory, Methods & Applications 74 (1), 244-256, 2011 | 7 | 2011 |