Exponential ergodicity and regularity for equations with Lévy noise E Priola, A Shirikyan, L Xu, J Zabczyk Stochastic Processes and their Applications 122 (1), 106-133, 2012 | 69 | 2012 |

Self-normalized Cramér-type moderate deviations under dependence X Chen, QM Shao, WB Wu, L Xu | 54 | 2016 |

Multivariate approximations in Wasserstein distance by Stein’s method and Bismut’s formula X Fang, QM Shao, L Xu Probability Theory and Related Fields 174, 945-979, 2019 | 51 | 2019 |

Exponential Ergodicity of Stochastic Burgers Equations Driven by *α*-Stable ProcessesZ Dong, L Xu, X Zhang Journal of Statistical Physics 154, 929-949, 2014 | 47 | 2014 |

Gradient estimates for SDEs driven by multiplicative Lévy noise FY Wang, L Xu, X Zhang Journal of Functional Analysis 269 (10), 3195-3219, 2015 | 44 | 2015 |

Invariant measures of stochastic Navier-Stokes equation driven by -stable processes Z Dong, L Xu, X Zhang | 41 | 2011 |

Ergodicity of the stochastic real Ginzburg–Landau equation driven by α-stable noises L Xu Stochastic Processes and their Applications 123 (10), 3710-3736, 2013 | 39 | 2013 |

Exponential mixing for some SPDEs with Lévy noise E Priola, L Xu, J Zabczyk Stochastics and Dynamics 11 (02n03), 521-534, 2011 | 38 | 2011 |

Ergodicity of the 3D stochastic Navier–Stokes equations driven by mildly degenerate noise M Romito, L Xu Stochastic processes and their applications 121 (4), 673-700, 2011 | 38 | 2011 |

Approximation of stable law in Wasserstein-1 distance by Stein's method L Xu The Annals of Applied Probability 29 (1), 458-504, 2019 | 36 | 2019 |

Log-Harnack inequality for stochastic Burgers equations and applications FY Wang, JL Wu, L Xu Journal of mathematical analysis and applications 384 (1), 151-159, 2011 | 36 | 2011 |

Derivative formula and applications for hyperdissipative stochastic Navier–Stokes/Burgers equations FY Wang, L Xu Infinite Dimensional Analysis, Quantum Probability and Related Topics 15 (03 …, 2012 | 29 | 2012 |

A generalized Catoni’s M-estimator under finite α-th moment assumption with α∈(1, 2) P Chen, X Jin, X Li, L Xu Electronic Journal of Statistics 15 (2), 5523-5544, 2021 | 26 | 2021 |

Stein’s Method for Asymmetric -stable Distributions, with Application to the Stable CLT P Chen, I Nourdin, L Xu Journal of Theoretical Probability 34 (3), 1382-1407, 2021 | 21 | 2021 |

Ergodicity of the finite and infinite dimensional α-stable systems L Xu, B Zegarliński Stochastic analysis and applications 27 (4), 797-824, 2009 | 21 | 2009 |

Approximation to stable law by the Lindeberg principle P Chen, L Xu Journal of Mathematical Analysis and Applications 480 (2), 123338, 2019 | 18 | 2019 |

Asymptotics for stochastic reaction–diffusion equation driven by subordinate Brownian motion R Wang, L Xu Stochastic Processes and their Applications 128 (5), 1772-1796, 2018 | 18 | 2018 |

A modified log-Harnack inequality and asymptotically strong Feller property L Xu Journal of Evolution Equations 11 (4), 925-942, 2011 | 18 | 2011 |

Approximation of the invariant measure of stable SDEs by an Euler–Maruyama scheme P Chen, CS Deng, RL Schilling, L Xu Stochastic Processes and their Applications 163, 136-167, 2023 | 17 | 2023 |

Irreducibility of stochastic real Ginzburg–Landau equation driven by -stable noises and applications R Wang, J Xiong, L Xu | 17 | 2017 |