The inverse scattering problem for a homogeneous bi-isotropic slab using transient data
(1992) In Technical Report LUTEDX/(TEAT-7022)/1-13/(1992)- Abstract
- Transient wave propagation in a finite bi-isotropic slab is treated. The incident
field impinges normally on the slab, which can be inhomogeneous wrt
depth. Dispersion and bi-isotropy are modeled by time convolutions in the
constitutive relations. Outside the slab the medium is assumed to be homogeneous,
non-dispersive and isotropic, and such that there is no phase velocity
mismatch at the boundaries of the slab. Two alternative methods of solution
to the propagation problem are given—the imbedding method and the Green
function approach. The second method is used to solve the inverse problem
and the first to generate synthetic data. The inverse scattering problem is... (More) - Transient wave propagation in a finite bi-isotropic slab is treated. The incident
field impinges normally on the slab, which can be inhomogeneous wrt
depth. Dispersion and bi-isotropy are modeled by time convolutions in the
constitutive relations. Outside the slab the medium is assumed to be homogeneous,
non-dispersive and isotropic, and such that there is no phase velocity
mismatch at the boundaries of the slab. Two alternative methods of solution
to the propagation problem are given—the imbedding method and the Green
function approach. The second method is used to solve the inverse problem
and the first to generate synthetic data. The inverse scattering problem is to
reconstruct the four susceptibility kernels of the medium using a set of finite
time trace of reflection and transmission data. (Less)
Please use this url to cite or link to this publication:
https://lup.lub.lu.se/record/530214
- author
- Kristensson, Gerhard LU and Rikte, Sten LU
- organization
- publishing date
- 1992
- type
- Book/Report
- publication status
- published
- subject
- in
- Technical Report LUTEDX/(TEAT-7022)/1-13/(1992)
- pages
- 13 pages
- publisher
- [Publisher information missing]
- language
- English
- LU publication?
- yes
- additional info
- Published version: Inverse Problems in Mathematical Physics, Eds. L. Päivärinta and E. Somersalo, pp. 112-125, Springer, Berlin, 1993.
- id
- a2a7a0c5-3975-4cac-a434-b2e0924a21dd (old id 530214)
- date added to LUP
- 2016-04-04 13:09:39
- date last changed
- 2018-11-21 21:12:29
@techreport{a2a7a0c5-3975-4cac-a434-b2e0924a21dd, abstract = {{Transient wave propagation in a finite bi-isotropic slab is treated. The incident<br/><br> field impinges normally on the slab, which can be inhomogeneous wrt<br/><br> depth. Dispersion and bi-isotropy are modeled by time convolutions in the<br/><br> constitutive relations. Outside the slab the medium is assumed to be homogeneous,<br/><br> non-dispersive and isotropic, and such that there is no phase velocity<br/><br> mismatch at the boundaries of the slab. Two alternative methods of solution<br/><br> to the propagation problem are given—the imbedding method and the Green<br/><br> function approach. The second method is used to solve the inverse problem<br/><br> and the first to generate synthetic data. The inverse scattering problem is to<br/><br> reconstruct the four susceptibility kernels of the medium using a set of finite<br/><br> time trace of reflection and transmission data.}}, author = {{Kristensson, Gerhard and Rikte, Sten}}, institution = {{[Publisher information missing]}}, language = {{eng}}, series = {{Technical Report LUTEDX/(TEAT-7022)/1-13/(1992)}}, title = {{The inverse scattering problem for a homogeneous bi-isotropic slab using transient data}}, url = {{https://lup.lub.lu.se/search/files/6062792/624847.pdf}}, year = {{1992}}, }