Global solution and blow-up for a class of pseudo p-Laplacian evolution equations with logarithmic nonlinearity LX Truong Computers & Mathematics with Applications 73 (9), 2076-2091, 2017 | 74 | 2017 |

Global solution and blow-up for a class of p-Laplacian evolution equations with logarithmic nonlinearity CN Le, XT Le Acta Applicandae Mathematicae 151 (1), 149-169, 2017 | 44 | 2017 |

Positive solutions for an m-point boundary-value problem. LX Truong, LTP Ngoc, NT Long Electronic Journal of Differential Equations (EJDE)[electronic only] 2008 …, 2008 | 29 | 2008 |

Existence and asymptotic expansion for a viscoelastic problem with a mixed nonhomogeneous condition NT Long, LX Truong Nonlinear Analysis: Theory, Methods & Applications 67 (3), 842-864, 2007 | 28 | 2007 |

On a fractional differential inclusion with integral boundary conditions in Banach space P Phung, L Truong Fractional Calculus and Applied Analysis 16 (3), 538-558, 2013 | 27 | 2013 |

On the existence of a three point boundary value problem at resonance in Rn PD Phung, LX Truong Journal of Mathematical Analysis and Applications 416 (2), 522-533, 2014 | 23 | 2014 |

The Nehari manifold for fractional p-Laplacian equation with logarithmic nonlinearity on whole space LX Truong Computers & Mathematics with Applications 78 (12), 3931-3940, 2019 | 21 | 2019 |

Existence, blow-up and exponential decay estimates for a nonlinear wave equation with boundary conditions of two-point type LX Truong, APN Dinh, NT Long Nonlinear Analysis: Theory, Methods & Applications 74 (18), 6933-6949, 2011 | 20 | 2011 |

High-order iterative schemes for a nonlinear Kirchhoff–Carrier wave equation associated with the mixed homogeneous conditions LX Truong, NT Long Nonlinear Analysis: Theory, Methods & Applications 71 (1-2), 467-484, 2009 | 15 | 2009 |

Potential well method for p (x)-Laplacian equations with variable exponent sources Q Van Chuong, LX Truong Nonlinear Analysis: Real World Applications 56, 103155, 2020 | 13 | 2020 |

The n-order iterative schemes for a nonlinear Kirchhoff–Carrier wave equation associated with the mixed inhomogeneous conditions LX Truong, NT Long Applied mathematics and computation 215 (5), 1908-1925, 2009 | 13 | 2009 |

On fractional differential inclusions with Nonlocal boundary conditions C Castaing, C Godet-Thobie, PD Phung, LX Truong Fractional Calculus and Applied Analysis 22 (2), 2019 | 12 | 2019 |

On a class of nonlinear heat equations with viscoelastic term LX Truong, N Van Y Computers & Mathematics with Applications 72 (1), 216-232, 2016 | 12 | 2016 |

Existence of solutions to three-point boundary-value problems at resonance PD Phung, LX Truong Electronic Journal of Differential Equations 115 (2016), 1-13, 2016 | 12 | 2016 |

The regularity and exponential decay of solution for a linear wave equation associated with two-point boundary conditions LX Truong, APN Dinh, NT Long Nonlinear Analysis: Real World Applications 11 (3), 1289-1303, 2010 | 10 | 2010 |

An N-order iterative scheme for a nonlinear Kirchhoff-Carrier wave equation associated with mixed homogeneous conditions PN LE THI, T LE XUAN, TL NGUYEN | 10 | 2010 |

Existence of positive solutions for a multi-point four-order boundary-value problem T Le Xuan, PD Phung Electronic Journal of Differential Equations 2011 (129), 1-10, 2011 | 9 | 2011 |

Fractional order of evolution inclusion coupled with a time and state dependent maximal monotone operator C Castaing, C Godet-Thobie, LX Truong Mathematics 8 (9), 1395, 2020 | 8 | 2020 |

Existence and asymptotic expansion of solutions to a nonlinear wave equation with a memory condition at the boundary. NT Long, LX Truong Electronic Journal of Differential Equations (EJDE)[electronic only] 2007 …, 2007 | 8 | 2007 |

The Nehari manifold for a class of Schrödinger equation involving fractional *p-*Laplacian and sign-changing logarithmic nonlinearityLX Truong Journal of Mathematical Physics 60 (11), 111505, 2019 | 7 | 2019 |