The occurrence of collapse for quasilinear equations of parabolic and hyperbolic types VK Kalantarov, OA Ladyzhenskaya Journal of Soviet Mathematics 10, 53-70, 1978 | 493 | 1978 |

Global attractors and determining modes for the 3D Navier-Stokes-Voight equations VK Kalantarov, ES Titi Chinese Annals of Mathematics, Series B 30 (6), 697-714, 2009 | 174 | 2009 |

Finite-dimensional attractors for the quasi-linear strongly-damped wave equation V Kalantarov, S Zelik Journal of Differential Equations 247 (4), 1120-1155, 2009 | 119 | 2009 |

Gevrey regularity for the attractor of the 3D Navier–Stokes–Voight equations VK Kalantarov, B Levant, ES Titi Journal of Nonlinear Science 19, 133-152, 2009 | 116 | 2009 |

On continuous dependence on coefficients of the Brinkman–Forchheimer equations AO Çelebi, VK Kalantarov, D Uğurlu Applied mathematics letters 19 (8), 801-807, 2006 | 116 | 2006 |

Smooth attractors for the Brinkman-Forchheimer equations with fast growing nonlinearities VK Kalantarov, S Zelik arXiv preprint arXiv:1101.4070, 2011 | 101 | 2011 |

Attractors for some nonlinear problems in mathematical physics VK Kalantarov IN: Boundary value problems of mathematical physics and related problems in …, 1986 | 86 | 1986 |

Attractors for the generalized Benjamin–Bona–Mahony equation AO Celebi, VK Kalantarov, M Polat journal of differential equations 157 (2), 439-451, 1999 | 78 | 1999 |

Attractors for damped quintic wave equations in bounded domains V Kalantarov, A Savostianov, S Zelik Annales Henri Poincaré 17 (9), 2555-2584, 2016 | 60 | 2016 |

Continuous dependence for the convective Brinkman–Forchheimer equations AO Çelebi, VK Kalantarov, D U [gtilde] urlu Applicable Analysis 84 (9), 877-888, 2005 | 54 | 2005 |

The convective Cahn–Hilliard equation A Eden, VK Kalantarov Applied Mathematics Letters 20 (4), 455-461, 2007 | 52 | 2007 |

A remark on two constructions of exponential attractors for α-contractions A Eden, C Foias, V Kalantarov Journal of Dynamics and Differential Equations 10, 37-45, 1998 | 43 | 1998 |

Uniform decay rates for the energy of weakly damped defocusing semilinear Schrödinger equations with inhomogeneous Dirichlet boundary control T Özsarı, VK Kalantarov, I Lasiecka Journal of Differential Equations 251 (7), 1841-1863, 2011 | 35 | 2011 |

The asymptotic behavior of solutions to an inverse problem for differential operator equations AF Güvenilir, VK Kalantarov Mathematical and computer Modelling 37 (9-10), 907-914, 2003 | 31 | 2003 |

3D convective Cahn--Hilliard equation A Eden, VK Kalantarov Communications on Pure and Applied Analysis 6 (4), 1075-1086, 2007 | 30 | 2007 |

Global behavior of solutions of nonlinear equations of mathematical physics of classical and non-classical type, Postdoctoral Thesis, St VK Kalantarov St. Petersburg, 1988 | 30 | 1988 |

Finite-dimensional attractors for a class of semilinear wave equations. AEVK Kalantarov Turkish J. Math. 20 (3), 425-450, 1996 | 29 | 1996 |

Global attractors for 2D Navier–Stokes–Voight equations in an unbounded domain AO Çelebı, VK Kalantarov, M Polat Applicable Analysis 88 (3), 381-392, 2009 | 28 | 2009 |

On the minimal global attractor for the phase field equations VK Kalantarov Zapiski Nauchnykh Seminarov POMI 188, 70-86, 1991 | 27 | 1991 |

Blow up of solutions to the initial boundary value problem for quasilinear strongly damped wave equations BA Bilgin, VK Kalantarov Journal of Mathematical Analysis and Applications 403 (1), 89-94, 2013 | 23 | 2013 |