Crossref Citations
This article has been cited by the following publications. This list is generated based on data provided by
Crossref.
Duru, Kenneth
and
Kreiss, Gunilla
2012.
On the Accuracy and Stability of the Perfectly Matched Layer in Transient Waveguides.
Journal of Scientific Computing,
Vol. 53,
Issue. 3,
p.
642.
Kreiss, Gunilla
and
Duru, Kenneth
2013.
Discrete stability of perfectly matched layers for anisotropic wave equations in first and second order formulation.
BIT Numerical Mathematics,
Vol. 53,
Issue. 3,
p.
641.
Duru, Kenneth
and
Kreiss, Gunilla
2014.
Numerical interaction of boundary waves with perfectly matched layers in two space dimensional elastic waveguides.
Wave Motion,
Vol. 51,
Issue. 3,
p.
445.
Duru, Kenneth
and
Kreiss, Gunilla
2014.
Boundary Waves and Stability of the Perfectly Matched Layer for the Two Space Dimensional Elastic Wave Equation in Second Order Form.
SIAM Journal on Numerical Analysis,
Vol. 52,
Issue. 6,
p.
2883.
Zhang, Zhenguo
Zhang, Wei
and
Chen, Xiaofei
2014.
Complex frequency-shifted multi-axial perfectly matched layer for elastic wave modelling on curvilinear grids.
Geophysical Journal International,
Vol. 198,
Issue. 1,
p.
140.
Duru, Kenneth
2014.
A perfectly matched layer for the time-dependent wave equation in heterogeneous and layered media.
Journal of Computational Physics,
Vol. 257,
Issue. ,
p.
757.
Duru, Kenneth
and
Kreiss, Gunilla
2014.
Efficient and stable perfectly matched layer for CEM.
Applied Numerical Mathematics,
Vol. 76,
Issue. ,
p.
34.
Fathi, Arash
Poursartip, Babak
and
Kallivokas, Loukas F.
2015.
Time‐domain hybrid formulations for wave simulations in three‐dimensional PML‐truncated heterogeneous media.
International Journal for Numerical Methods in Engineering,
Vol. 101,
Issue. 3,
p.
165.
Duru, Kenneth
Kozdon, Jeremy E.
and
Kreiss, Gunilla
2015.
Boundary conditions and stability of a perfectly matched layer for the elastic wave equation in first order form.
Journal of Computational Physics,
Vol. 303,
Issue. ,
p.
372.
Virta, Kristoffer
and
Kreiss, Gunilla
2015.
Interface waves in almost incompressible elastic materials.
Journal of Computational Physics,
Vol. 303,
Issue. ,
p.
313.
Duru, Kenneth
2016.
The Role of Numerical Boundary Procedures in the Stability of Perfectly Matched Layers.
SIAM Journal on Scientific Computing,
Vol. 38,
Issue. 2,
p.
A1171.
Assi, Hisham
and
Cobbold, Richard S. C.
2016.
A perfectly matched layer formulation for modeling transient wave propagation in an unbounded fluid–solid medium.
The Journal of the Acoustical Society of America,
Vol. 139,
Issue. 4,
p.
1528.
Ping, Ping
Zhang, Yu
Xu, Yixian
and
Chu, Risheng
2016.
Efficiency of perfectly matched layers for seismic wave modeling in second-order viscoelastic equations.
Geophysical Journal International,
Vol. 207,
Issue. 3,
p.
1367.
Assi, Hisham
and
Cobbold, Richard S.
2017.
Compact second-order time-domain perfectly matched layer formulation for elastic wave propagation in two dimensions.
Mathematics and Mechanics of Solids,
Vol. 22,
Issue. 1,
p.
20.
Oliveira, Saulo Pomponet
2018.
Error Analysis of Chebyshev Spectral Element Methods for the Acoustic Wave Equation in Heterogeneous Media.
Journal of Theoretical and Computational Acoustics,
Vol. 26,
Issue. 03,
p.
1850035.
Ma, Jian
Yang, Dinghui
Tong, Ping
and
Ma, Xiao
2018.
TSOS and TSOS-FK hybrid methods for modelling the propagation of seismic waves.
Geophysical Journal International,
Vol. 214,
Issue. 3,
p.
1665.
Oliveira, Saulo Pomponet
and
Leite, Stela Angelozi
2018.
Error analysis of the spectral element method with Gauss–Lobatto–Legendre points for the acoustic wave equation in heterogeneous media.
Applied Numerical Mathematics,
Vol. 129,
Issue. ,
p.
39.
Ma, Xiao
Yang, Dinghui
Huang, Xueyuan
and
Zhou, Yanjie
2018.
Nonsplit complex-frequency shifted perfectly matched layer combined with symplectic methods for solving second-order seismic wave equations — Part 1: Method.
GEOPHYSICS,
Vol. 83,
Issue. 6,
p.
T301.
Ma, Xiao
Yang, Dinghui
He, Xijun
Huang, Xueyuan
and
Song, Jiaxing
2019.
Nonsplit complex-frequency-shifted perfectly matched layer combined with symplectic methods for solving second-order seismic wave equations — Part 2: Wavefield simulations.
GEOPHYSICS,
Vol. 84,
Issue. 3,
p.
T167.
Ma, Xiao
Li, Yangjia
and
Song, Jiaxing
2019.
A stable auxiliary differential equation perfectly matched layer condition combined with low-dispersive symplectic methods for solving second-order elastic wave equations.
GEOPHYSICS,
Vol. 84,
Issue. 4,
p.
T193.