Multi-symplectic Runge–Kutta methods for nonlinear Dirac equations J Hong, C Li Journal of Computational Physics 211 (2), 448-472, 2006 | 122 | 2006 |

The existence of almost periodic solutions for a class of differential equations with piecewise constant argument Y Rong, J Hong Nonlinear Analysis: Theory, Methods & Applications 28 (8), 1439-1450, 1997 | 122 | 1997 |

Explicit multi-symplectic methods for Klein–Gordon–Schrödinger equations J Hong, S Jiang, C Li Journal of Computational Physics 228 (9), 3517-3532, 2009 | 90 | 2009 |

Splitting multisymplectic integrators for Maxwell’s equations L Kong, J Hong, J Zhang Journal of Computational Physics 229 (11), 4259-4278, 2010 | 86 | 2010 |

Globally conservative properties and error estimation of a multi-symplectic scheme for Schrödinger equations with variable coefficients J Hong, Y Liu, H Munthe-Kaas, A Zanna Applied numerical mathematics 56 (6), 814-843, 2006 | 86 | 2006 |

The multi-symplecticity of partitioned Runge-Kutta methods for Hamiltonian PDEs J Hong, H Liu, G Sun Mathematics of computation 75 (253), 167, 2006 | 77 | 2006 |

Strong convergence rates of semidiscrete splitting approximations for the stochastic Allen–Cahn equation CE Bréhier, J Cui, J Hong IMA Journal of Numerical Analysis 39 (4), 2096-2134, 2019 | 75 | 2019 |

High-order compact splitting multisymplectic method for the coupled nonlinear Schrödinger equations Y Ma, L Kong, J Hong, Y Cao Computers & Mathematics with Applications 61 (2), 319-333, 2011 | 67 | 2011 |

Exponential dichotomy and trichotomy for difference equations AI Alonso, J Hong, R Obaya Computers & Mathematics with Applications 38 (1), 41-49, 1999 | 65 | 1999 |

Strong convergence rate of finite difference approximations for stochastic cubic Schrödinger equations J Cui, J Hong, Z Liu Journal of Differential Equations 263 (7), 3687-3713, 2017 | 60 | 2017 |

Almost periodic solutions of differential equations with piecewise constant argument R Yuan, J Hong Analysis 16 (2), 171-180, 1996 | 56 | 1996 |

Strong convergence rate of splitting schemes for stochastic nonlinear Schrödinger equations J Cui, J Hong, Z Liu, W Zhou Journal of Differential Equations 266 (9), 5625-5663, 2019 | 55 | 2019 |

Strong and weak convergence rates of a spatial approximation for stochastic partial differential equation with one-sided Lipschitz coefficient J Cui, J Hong SIAM Journal on Numerical Analysis 57 (4), 1815-1841, 2019 | 53 | 2019 |

Approximating stochastic evolution equations with additive white and rough noises Y Cao, J Hong, Z Liu SIAM Journal on Numerical Analysis 55 (4), 1958-1981, 2017 | 51 | 2017 |

Almost periodic type solutions of differential equations with piecewise constant argument via almost periodic type sequences AI Alonso, J Hong, R Obaya Applied Mathematics Letters 13 (2), 131-137, 2000 | 50 | 2000 |

Stochastic multi-symplectic integrator for stochastic nonlinear Schrödinger equation S Jiang, L Wang, J Hong Communications in Computational Physics 14 (2), 393-411, 2013 | 49 | 2013 |

A novel numerical approach to simulating nonlinear Schrödinger equations with varying coefficients J Hong, Y Liu Applied mathematics letters 16 (5), 759-765, 2003 | 49 | 2003 |

Almost periodic type solutions of some differential equations with piecewise constant argument J Hong, R Obaya, A Sanz Nonlinear analysis 45 (6), 661-688, 2001 | 48 | 2001 |

Multi-symplectic Runge–Kutta–Nyström methods for nonlinear Schrödinger equations with variable coefficients J Hong, X Liu, C Li Journal of Computational Physics 226 (2), 1968-1984, 2007 | 47 | 2007 |

Discrete gradient approach to stochastic differential equations with a conserved quantity J Hong, S Zhai, J Zhang SIAM journal on numerical analysis 49 (5), 2017-2038, 2011 | 44 | 2011 |