Benchmarking graph neural networks VP Dwivedi, CK Joshi, AT Luu, T Laurent, Y Bengio, X Bresson Journal of Machine Learning Research 24 (43), 1-48, 2023 | 859 | 2023 |

Residual gated graph convnets X Bresson, T Laurent arXiv preprint arXiv:1711.07553, 2017 | 363 | 2017 |

An efficient graph convolutional network technique for the travelling salesman problem CK Joshi, T Laurent, X Bresson arXiv preprint arXiv:1906.01227, 2019 | 361 | 2019 |

Global-in-time weak measure solutions and finite-time aggregation for nonlocal interaction equations JA Carrillo, M DiFrancesco, A Figalli, T Laurent, D Slepčev | 327 | 2011 |

Blow-up in multidimensional aggregation equations with mildly singular interaction kernels AL Bertozzi, JA Carrillo, T Laurent Nonlinearity 22 (3), 683, 2009 | 248 | 2009 |

Graph neural networks with learnable structural and positional representations VP Dwivedi, AT Luu, T Laurent, Y Bengio, X Bresson arXiv preprint arXiv:2110.07875, 2021 | 195 | 2021 |

*L*^{p} theory for the multidimensional aggregation equationAL Bertozzi, T Laurent, J Rosado Communications on Pure and Applied Mathematics 64 (1), 45-83, 2011 | 170 | 2011 |

Dimensionality of local minimizers of the interaction energy D Balagué, JA Carrillo, T Laurent, G Raoul Archive for Rational Mechanics and Analysis 209, 1055-1088, 2013 | 169 | 2013 |

Deep linear networks with arbitrary loss: All local minima are global T Laurent, J Brecht International conference on machine learning, 2902-2907, 2018 | 166 | 2018 |

Learning the travelling salesperson problem requires rethinking generalization CK Joshi, Q Cappart, LM Rousseau, T Laurent arXiv preprint arXiv:2006.07054, 2020 | 148 | 2020 |

Finite-Time Blow-up of Solutions of an Aggregation Equation in *R* ^{ n }AL Bertozzi, T Laurent Communications in mathematical physics 274, 717-735, 2007 | 145 | 2007 |

Local and global existence for an aggregation equation T Laurent Communications in Partial Differential Equations 32 (12), 1941-1964, 2007 | 131 | 2007 |

Nonlocal interactions by repulsive–attractive potentials: radial ins/stability D Balagué, JA Carrillo, T Laurent, G Raoul Physica D: Nonlinear Phenomena 260, 5-25, 2013 | 118 | 2013 |

Aggregation and spreading via the Newtonian potential: The dynamics of patch solutions A Bertozzi, T Laurent, F Leger Mathematical Models and Methods in Applied Sciences 22, 2012 | 108* | 2012 |

Multiclass total variation clustering X Bresson, T Laurent, D Uminsky, J Von Brecht Advances in neural information processing systems 26, 2013 | 104 | 2013 |

Consistency of cheeger and ratio graph cuts NG Trillos, D Slepcev, J von Brecht, T Laurent, X Bresson arXiv preprint arXiv:1411.6590, 2014 | 94 | 2014 |

The transformer network for the traveling salesman problem X Bresson, T Laurent arXiv preprint arXiv:2103.03012, 2021 | 73 | 2021 |

A two-step graph convolutional decoder for molecule generation X Bresson, T Laurent arXiv preprint arXiv:1906.03412, 2019 | 70 | 2019 |

A recurrent neural network without chaos T Laurent, J von Brecht arXiv preprint arXiv:1612.06212, 2016 | 69 | 2016 |

Convergence and energy landscape for Cheeger cut clustering X Bresson, T Laurent, D Uminsky, J Brecht Advances in neural information processing systems 25, 2012 | 68 | 2012 |