http://iet.metastore.ingenta.com
1887

MRFD method for numerical solution of wave propagation in layered media with general boundary condition

MRFD method for numerical solution of wave propagation in layered media with general boundary condition

For access to this article, please select a purchase option:

Buy article PDF
$19.95
(plus tax if applicable)
Buy Knowledge Pack
10 articles for $120.00
(plus taxes if applicable)

IET members benefit from discounts to all IET publications and free access to E&T Magazine. If you are an IET member, log in to your account and the discounts will automatically be applied.

Learn more about IET membership 

Recommend Title Publication to library

You must fill out fields marked with: *

Librarian details
Name:*
Email:*
Your details
Name:*
Email:*
Department:*
Why are you recommending this title?
Select reason:
 
 
 
 
 
Electronics Letters — Recommend this title to your library

Thank you

Your recommendation has been sent to your librarian.

A fast adaptive wavelet-based method, called multiresolution finite difference (MRFD), is proposed to simulate the wave propagation in multilayered media with general boundary. It is a promising method for complex media because of its robustness and small computational burden. Numerical results derived from geophysics exploration show the effectiveness and potential of the method.

References

    1. 1)
      • I. Daubechies . Orthonormal bases of compactly supported wavelets. Comm. Pure Appl. Math. , 909 - 996
    2. 2)
      • G. Beylkin . On the representation of operators in bases of compactly supported wavelets. SIAM J. Numer. Anal. , 1716 - 1740
    3. 3)
      • Y.P. Wang . Image representations using multiscale differential operators. IEEE Trans. Image Process. , 12 , 1757 - 1771
    4. 4)
      • J.W. Ma , Y.P. Zhu , H.Z. Yang . Multiscale-combined seismic waveform inversion using orthogonal wavelettransform. Electron. Lett. , 4 , 261 - 262
    5. 5)
      • J.W. Ma , H.Z. Yang , Y.P. Zhu . A discussion about multiscale seismic waveform inversion. Chinese J. Prog. Geophys. , 4 , 54 - 61
    6. 6)
      • Y.Z. Wang , W.B. Wang . Analysis of propagation and reflection of monopulse in layered and lossy media using multiscale wavelet collocation method. Electron. Lett. , 6 , 497 - 498
    7. 7)
      • J. Liang , S. Elangovan . Application of wavelet transform in travelling wave protection. Electr. Power Energy Syst. , 537 - 542
    8. 8)
      • I.T. Kosmanis . A hybrid FDTD-wavelet galerkin technique for the numerical analysis offield singularities inside waveguides. IEEE Trans. Magn. , 4 , 902 - 906
    9. 9)
      • V. Oleg , P. Samuel . A multilevel wavelet collocation method for solving PDEs in finite domain. J. Comput. Phys. , 33 - 47
http://iet.metastore.ingenta.com/content/journals/10.1049/el_20010822
Loading

Related content

content/journals/10.1049/el_20010822
pub_keyword,iet_inspecKeyword,pub_concept
6
6
Loading
This is a required field
Please enter a valid email address