期刊论文:
[41]
Chen, H.*, H. Zhou, and Y. Rao, 2019, A matrix-transform numerical solver for fractional Laplacian viscoacoustic wave equation: Geophysics, 84(4), T283–T297.
[42]
Chen, H.*, H. Zhou, S. Jiang, and Y. Rao, 2019, Fractional Laplacian viscoacoustic wave equation low-rank temporal extrapolation: IEEE Access, 7, 93187–93197.
[43]
Zheng, Q.*, and L. Lu, 2019, On parameterized matrix splitting preconditioner for the saddle point problems: International Journal of Computer Mathematics, 96, 1–17.
[44]
Yao, G.*, N. V. da Silva, M. Warner, and T. Kalinicheva, 2018, Separation of migration and tomography modes of full‐waveform inversion in the plane wave domain: Journal of Geophysical Research: Solid Earth, 123, no. 2, 1486–1501.
[45]
Yao, G., N. da Silva, and D. Wu*, 2018, An effective absorbing layer for the boundary condition in acoustic seismic wave simulation: Journal of Geophysics and Engineering, 15, no. 2, 495–511.
[46]
Yao, G., N. da Silva, and D. Wu*, 2018, Sensitivity analyses of acoustic impedance inversion with full-waveform inversion: Journal of Geophysics and Engineering, 15, no. 2, 461–477.
[47]
Yao, G.*, N. V. da Silva, H. A. Debens, and D. Wu, 2018, Accurate seabed modeling using finite difference methods: Computational Geosciences, 22, no. 2, 469–484.
[48]
Yao, G.*, N. V. da Silva, and D. Wu, 2018, Forward modelling formulas for least-squares reverse-time migration: Exploration Geophysics, 49, no. 4, 506–518.
[49]
da Silva*, N. V., and G. Yao, 2018, Wavefield reconstruction inversion with a multiplicative cost function: Inverse Problems, 34, no. 1, 015004.
[50]
da Silva*, N. V., G. Yao, and M. Warner, 2018, Semi-global inversion of vp to vs ratio for elastic wavefield inversion: Inverse Problems, 34, no. 11, 115011.
[51]
Yao, G., N. V. da Silva, and D. Wu*, 2018, An effective absorbing layer for the boundary condition in acoustic seismic wave simulation: Journal of Geophysics and Engineering, 15(2), 495–511.
[52]
Yao, G., and D. Wu*, 2017, Reflection full waveform inversion: Science China Earth Sciences, 60(10), 1783–1794.
[53]
Chen, H.*, H. Zhou, and Q. Zhang, 2017, Modeling elastic wave propagation using k-space operator-based temporal high-order staggered-grid finite-difference method: IEEE Transactions on Geoscience and Remote Sensing, 55(2), 801–815.
[54]
Zheng, Q.*, and L. Lu, 2017, A shift-splitting preconditioner for a class of block two-by-two linear systems: Applied Mathematics Letters, 66, 54–60.
[55]
Zheng, Q.*, and L. Lu, 2017, Extended shift-splitting preconditioners for saddle point problems: Journal of Computational and Applied Mathematics, 313, 70–81.
[56]
Yao, G.*, and H. Jakubowicz, 2016, Least-squares reverse-time migration in a matrix-based formulation: Geophysical Prospecting, 64(3), 611–621.
[57]
Yao, G., D. Wu*, and H. A. Debens, 2016, Adaptive finite difference for seismic wavefield modelling in acoustic media: Scientific Reports, 6, 30302.
[58]
Wu, D., G. Yao*, J. Cao, and Y. Wang, 2016, Least-squares RTM with L1 norm regularisation: Journal of Geophysics and Engineering, 13(5), 666–673.
[59]
Yao, G., D. Wu*, and H. A. Debens, 2016, Adaptive finite difference for seismic wavefield modelling in acoustic media: Scientific Reports, 6, 30302.
[60]
Chen, H.*, H. Zhou, and Q. Li, 2016, Two efficient modeling schemes for fractional Laplacian viscoacoustic wave equation: Geophysics, 81(5), T233–T249.