Hamiltonian property of the Painlevé equations and the method of isomonodromic deformations BI Suleimanov Differential Equations 30 (5), 726-732, 1994 | 36 | 1994 |

Phase shift in the Whitham zone for the Gurevich–Pitaevskii special solution of the Korteweg–de Vries equation R Garifullin, B Suleimanov, N Tarkhanov Physics Letters A 374 (13-14), 1420-1424, 2010 | 28 | 2010 |

“Quantizations” of the second Painlevé equation and the problem of the equivalence of its *L*-*A* pairsBI Suleimanov Theoretical and Mathematical Physics 156, 1280-1291, 2008 | 28 | 2008 |

A soft mechanism for the generation of dissipationless shock waves V Kudashev, B Suleimanov Physics Letters A 221 (3-4), 204-208, 1996 | 28 | 1996 |

Onset of nondissipative shock waves and the``nonperturbative''quantum theory of gravitation BI Suleimanov Soviet Journal of Experimental and Theoretical Physics 78, 583-587, 1994 | 27 | 1994 |

Effect of a small dispersion on self-focusing in a spatially one-dimensional case BI Suleimanov JETP Letters 106, 400-405, 2017 | 24 | 2017 |

From weak discontinuities to nondissipative shock waves RN Garifullin, BI Suleimanov Journal of Experimental and Theoretical Physics 110, 133-146, 2010 | 24* | 2010 |

“Quantizations” of higher Hamiltonian analogues of the Painlevé I and Painlevé II equations with two degrees of freedom BI Suleimanov Functional analysis and its applications 48, 198-207, 2014 | 21 | 2014 |

THE RELATION BETWEEN ASYMPTOTIC PROPERTIES OF SOLUTIONS OF THE 2ND PAINLEVE EQUATION IN DIFFERENT DIRECTIONS TOWARDS INFINITY BI Suleimanov Differential Equations 23 (5), 569-576, 1987 | 20* | 1987 |

The effect of small dissipation on the onset of one-dimensional shock waves VR Kudashev, BI Suleimanov Journal of Applied Mathematics and Mechanics 65 (3), 441-451, 2001 | 19 | 2001 |

Solution of the Korteweg-de Vries equation which arises near the breaking point in problems with a slight dispersion BI Suleimanov JETP LETTERS C/C OF PIS'MA V ZHURNAL EKSPERIMENTAL'NOI TEORETICHESKOI FIZIKI …, 1993 | 19 | 1993 |

" Quantum" linearization of Painlev\'{e} equations as a component of their pairs B Suleimanov arXiv preprint arXiv:1302.6716, 2013 | 18 | 2013 |

Characteristic features of some typical spontaneous intensity collapse processes in unstable media VR Kudashev, BI Suleǐmanov Soviet Journal of Experimental and Theoretical Physics Letters 62, 382, 1995 | 18 | 1995 |

On asymptotics of regular solutions for a special kind of Painlevé V equation BI Suleimanov Lect. Notes in Math., Springer Verlag 1191, 230-255, 1986 | 17 | 1986 |

The second Painlevé equation at a problem about nonlinear effects near caustics BI Suleimanov Differential Geometry, Li Groups, and Mechanics, 110-128, 1991 | 15* | 1991 |

“Quantization” of an isomonodromic Hamiltonian Garnier system with two degrees of freedom DP Novikov, BI Suleimanov Theoretical and Mathematical Physics 187 (1), 479-496, 2016 | 11 | 2016 |

Quantization of some autonomous reduction of Painlevé equations and the old quantum theory BI Suleimanov Book of abstracts of International conference dedicated to the memory of IG …, 2011 | 11 | 2011 |

On two special functions related to fold singularities AM Il'in, BI Suleimanov Doklady. Mathematics 66 (3), 327-329, 2002 | 10 | 2002 |

Quantum aspects of the integrability of the third Painlevé equation and a non-stationary time Schrödinger equation with the Morse potential BI Suleimanov Ufimskii Matematicheskii Zhurnal 8 (3), 141-159, 2016 | 8* | 2016 |

Birth of step-like contrast structures connected with a cusp catastrophe AM Il'in, BI Suleimanov Sbornik: Mathematics 195 (12), 1727, 2004 | 8 | 2004 |