A simple, stable, and accurate linear tetrahedral finite element for transient, nearly, and fully incompressible solid dynamics: a dynamic variational multiscale approach G Scovazzi, B Carnes, X Zeng, S Rossi International Journal for Numerical Methods in Engineering 106 (10), 799-839, 2016 | 59 | 2016 |

A systematic approach for constructing higher-order immersed boundary and ghost fluid methods for fluid–structure interaction problems X Zeng, C Farhat Journal of Computational Physics 231 (7), 2892-2923, 2012 | 45 | 2012 |

A velocity/stress mixed stabilized nodal finite element for elastodynamics: Analysis and computations with strongly and weakly enforced boundary conditions G Scovazzi, T Song, X Zeng Computer Methods in Applied Mechanics and Engineering 325, 532-576, 2017 | 23 | 2017 |

A dynamic variational multiscale method for viscoelasticity using linear tetrahedral elements X Zeng, G Scovazzi, N Abboud, O Colomés, S Rossi International Journal for Numerical Methods in Engineering 112 (13), 1951-2003, 2017 | 20 | 2017 |

An enhanced FIVER method for multi-material flow problems with second-order convergence rate A Main, X Zeng, P Avery, C Farhat Journal of Computational Physics 329, 141-172, 2017 | 20 | 2017 |

A frame-invariant vector limiter for flux corrected nodal remap in arbitrary Lagrangian–Eulerian flow computations X Zeng, G Scovazzi Journal of Computational Physics 270, 753-783, 2014 | 18 | 2014 |

A general approach to enhance slope limiters on non-uniform grids X Zeng arXiv preprint arXiv:1301.0967, 2013 | 10 | 2013 |

A variational multiscale finite element method for monolithic ALE computations of shock hydrodynamics using nodal elements X Zeng, G Scovazzi Journal of Computational Physics 315, 577-608, 2016 | 8 | 2016 |

A general approach to enhance slope limiters in MUSCL schemes on nonuniform rectilinear grids X Zeng SIAM Journal on Scientific Computing 38 (2), A789-A813, 2016 | 7 | 2016 |

A simple, stable and accurate tetrahedral finite element for transient, nearly incompressible, linear and nonlinear elasticity: A dynamic variational multiscale approach G Scovazzi, B Carnes, X Zeng International Journal for Numerical Methods in Engineering, 2015 | 7 | 2015 |

A high-order hybrid finite difference–finite volume approach with application to inviscid compressible flow problems: A preliminary study X Zeng Computers & Fluids 98, 91-110, 2014 | 7 | 2014 |

A general approach to enhance slope limiters on non-uniform rectilinear grids X Zeng arXiv preprint arXiv:1301.0967, 2013 | 7 | 2013 |

A Systematic Procedure for Achieving Higher-Order Spatial Accuracy in Ghost Fluid and Other Embedded Boundary Methods for Fluid-Structure Interaction Problems X Zeng, C Farhat 20th AIAA Computational Fluid Dynamics Conference, 3389, 2011 | 2 | 2011 |

Mathematical modeling of PDGF-driven glioma reveals the dynamics of immune cells infiltrating into tumors B Niu, X Zeng, TA Phan, F Szulzewsky, S Holte, EC Holland, JP Tian Neoplasia 22 (9), 323-332, 2020 | 1 | 2020 |

On finite volume discretization of infiltration dynamics in tumor growth models X Zeng, MA Saleh, JP Tian Advances in Computational Mathematics 45 (5-6), 3057-3094, 2019 | 1 | 2019 |

Linear hybrid-variable methods for advection equations X Zeng Advances in Computational Mathematics 45 (2), 929-980, 2019 | 1 | 2019 |

A hybrid finite difference–finite volume approach to solve first-order hyperbolic conservation laws with superior accuracy X Zeng arXiv preprint arXiv:1212.5315, 2012 | 1 | 2012 |

High-Order Embedded Boundary Methods for Fluid-Structure Interaction X Zeng Stanford University, 2012 | 1 | 2012 |

On the Stability of Explicit Finite Difference Methods for Advection-Diffusion Equations X Zeng, MM Hasan arXiv preprint arXiv:2006.07799, 2020 | | 2020 |

An ALE/embedded boundary method for two-material flow simulations X Zeng, K Li, G Scovazzi Computers & Mathematics with Applications 78 (2), 335-361, 2019 | | 2019 |