Several interesting integral inequalities WJ Liu, QA Ngô, VN Huy J. Math. Inequal 3 (2), 201-212, 2009 | 51 | 2009 |

Notes on an integral inequality QA Ngo, DD Thang, TT Dat, DA Tuan J. Inequal. Pure Appl. Math 7 (4), 2006 | 49 | 2006 |

Ostrowski type inequalities on time scales for double integrals W Liu, QA Ngô, W Chen Acta applicandae mathematicae 110 (1), 477-497, 2010 | 46 | 2010 |

A generalization of Ostrowski inequality on time scales for k points W Liu, QA Ngô Applied Mathematics and Computation 203 (2), 754-760, 2008 | 46 | 2008 |

An Ostrowski–Grüss type inequality on time scales W Liu Computers & Mathematics with Applications 58 (6), 1207-1210, 2009 | 37 | 2009 |

A new generalization of Ostrowski type inequality on time scales W Liu, QA Ngo, W Chen arXiv preprint arXiv:0804.4310, 2008 | 28 | 2008 |

Sharp reversed Hardy–Littlewood–Sobolev inequality on R n QA Ngô Israel Journal of Mathematics 220 (1), 189-223, 2017 | 27 | 2017 |

A new point of view on the solutions to the Einstein constraint equations with arbitrary mean curvature and small TT-tensor R Gicquaud, QA Ngô Classical and Quantum Gravity 31 (19), 195014, 2014 | 26* | 2014 |

A perturbed Ostrowski-type inequality on time scales for k points for functions whose second derivatives are bounded L Wenjun Journal of Inequalities and Applications 2008, 2008 | 23 | 2008 |

A sharp Grüss type inequality on time scales and application to the sharp Ostrowski-Grüss inequality QUCANH NGÔ, W Liu Communications in Mathematical Analysis 6 (2), 2009 | 22 | 2009 |

Multiplicity of weak solutions for a class of nonuniformly elliptic equations of p-Laplacian type H Quoc Toan, QA Ngo Nonlinear Analysis: Theory, Methods & Applications 70 (4), 1536-1546, 2009 | 22 | 2009 |

Some Iyengar-type inequalities on time scales for functions whose second derivatives are bounded W Liu Applied Mathematics and Computation 216 (11), 3244-3251, 2010 | 20 | 2010 |

Existence results for the Einstein-scalar field Lichnerowicz equations on compact Riemannian manifolds X Xu Advances in Mathematics 230 (4-6), 2378-2415, 2012 | 18 | 2012 |

New bounds for the Ostrowski-like type inequalities VN Huy, QA Ngô Bulletin of the Korean Mathematical Society 48 (1), 95-104, 2011 | 18 | 2011 |

Some mean value theorems for integrals on time scales QA Ngô Applied Mathematics and Computation 213 (2), 322-328, 2009 | 17 | 2009 |

A new way to think about Ostrowski-like type inequalities VN Huy Computers & Mathematics with Applications 59 (9), 3045-3052, 2010 | 15 | 2010 |

On new Ostrowski type inequalities for double integrals on time scales W Liu, Q Anh Ngo, W Chen Dynamic Systems and Applications 19 (1), 189, 2010 | 15 | 2010 |

New inequalities of Simpson-like type involving n knots and the mth derivative VN Huy Mathematical and computer modelling 52 (3-4), 522-528, 2010 | 14 | 2010 |

New inequalities of Ostrowski-like type involving n knots and the Lp-norm of the m-th derivative VN Huy, QA Ngô Applied mathematics letters 22 (9), 1345-1350, 2009 | 13 | 2009 |

Sharp Reversed Hardy–Littlewood–Sobolev Inequality on the Half Space QA Ngô, VH Nguyen International Mathematics Research Notices 2017 (20), 6187-6230, 2017 | 11 | 2017 |