A well-posed and discretely stable perfectly matched layer for elastic wave equations in second order formulation K Duru, G Kreiss Communications in Computational Physics 11 (5), 1643-1672, 2012 | 50 | 2012 |

A suite of exercises for verifying dynamic earthquake rupture codes RA Harris, M Barall, B Aagaard, S Ma, D Roten, K Olsen, B Duan, D Liu, ... Seismological Research Letters 89 (3), 1146-1162, 2018 | 48 | 2018 |

Dynamic earthquake rupture simulations on nonplanar faults embedded in 3D geometrically complex, heterogeneous elastic solids K Duru, EM Dunham Journal of computational Physics 305, 185-207, 2016 | 39 | 2016 |

Magnetohydrodynamic flow of a Sisko fluid in annular pipe: A numerical study M Khan, Q Abbas, K Duru International journal for numerical methods in fluids 62 (10), 1169-1180, 2010 | 35 | 2010 |

Stable and high order accurate difference methods for the elastic wave equation in discontinuous media K Duru, K Virta Journal of Computational Physics 279, 37-62, 2014 | 21 | 2014 |

Numerical interaction of boundary waves with perfectly matched layers in two space dimensional elastic waveguides K Duru, G Kreiss Wave Motion 51 (3), 445-465, 2014 | 17 | 2014 |

Stable and high-order accurate boundary treatments for the elastic wave equation on second-order form K Duru, G Kreiss, K Mattsson SIAM Journal on Scientific Computing 36 (6), A2787-A2818, 2014 | 17 | 2014 |

Discrete stability of perfectly matched layers for anisotropic wave equations in first and second order formulation G Kreiss, K Duru BIT Numerical Mathematics 53 (3), 641-663, 2013 | 16 | 2013 |

Boundary conditions and stability of a perfectly matched layer for the elastic wave equation in first order form K Duru, JE Kozdon, G Kreiss Journal of Computational Physics 303, 372-395, 2015 | 12 | 2015 |

The role of numerical boundary procedures in the stability of perfectly matched layers K Duru SIAM Journal on Scientific Computing 38 (2), A1171-A1194, 2016 | 11 | 2016 |

On the accuracy and stability of the perfectly matched layer in transient waveguides K Duru, G Kreiss Journal of Scientific Computing 53 (3), 642-671, 2012 | 11 | 2012 |

ExaHyPE: an engine for parallel dynamically adaptive simulations of wave problems A Reinarz, DE Charrier, M Bader, L Bovard, M Dumbser, K Duru, F Fambri, ... Computer Physics Communications, 107251, 2020 | 9 | 2020 |

Perfectly matched layers for second order wave equations K Duru Uppsala University, 2010 | 9 | 2010 |

Stable and conservative time propagators for second order hyperbolic systems K Duru, K Mattsson, G Kreiss Div. Sc. Comp., Dept. of Infor. Tech., Uppsala University, 2011 | 8 | 2011 |

A perfectly matched layer for the time-dependent wave equation in heterogeneous and layered media K Duru Journal of Computational Physics 257, 757-781, 2014 | 7 | 2014 |

Boundary waves and stability of the perfectly matched layer for the two space dimensional elastic wave equation in second order form K Duru, G Kreiss SIAM Journal on Numerical Analysis 52 (6), 2883-2904, 2014 | 7 | 2014 |

Accurate and stable boundary treatments for elastic wave equations in second order formulation K Duru, G Kreiss, K Mattsson SIAM J. Sci. Comput 36 (6), A2787-A2818, 2014 | 7 | 2014 |

A new discontinuous Galerkin spectral element method for elastic waves with physically motivated numerical fluxes K Duru, L Rannabauer, AA Gabriel, H Igel arXiv preprint arXiv:1802.06380, 2018 | 6 | 2018 |

A stable discontinuous Galerkin method for linear elastodynamics in geometrically complex media using physics based numerical fluxes K Duru, L Rannabauer, OKA Ling, AA Gabriel, H Igel, M Bader arXiv preprint arXiv:1907.02658, 2019 | 5 | 2019 |

Efficient and stable perfectly matched layer for CEM K Duru, G Kreiss Applied Numerical Mathematics 76, 34-47, 2014 | 5 | 2014 |