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@INPROCEEDINGS{Kleefeld:1040320,
author = {Kleefeld, Andreas},
title = {{N}on-scattering wave numbers versus transmission
eigenvalues},
reportid = {FZJ-2025-01834},
year = {2025},
abstract = {An important question arising in inverse problems for wave
scattering is whether for a given inhomogeneous bounded
obstacle in two dimensions there is an incident wave that
does not scatter. Closely connected to this question is the
solution of the interior transmission problem.Therefore, let
$A$ be the discrete set of non-scattering wave numbers and
$B$ be the discrete set of transmission eigenvalues.It is
well-known that $A=B\neq \emptyset$ holds for a disk and
$B\supsetneq A=\emptyset$ holds for a square. The questions
remains whether there is a bounded obstacle for which
$A\subsetneq B$ with $A\neq \emptyset$. To address this
question, the problem at hand is recasted as a constrained
optimization problem using Fourier-Besselfunctions and then
finally solved numerically. Some numerical results are
presented and interesting observations are made both of
which merit further investigation.},
month = {Feb},
date = {2025-02-24},
organization = {Conference on Mathematics of Wave
Phenomena, Karlsruhe (Germany), 24 Feb
2025 - 28 Feb 2025},
subtyp = {After Call},
cin = {JSC},
cid = {I:(DE-Juel1)JSC-20090406},
pnm = {5112 - Cross-Domain Algorithms, Tools, Methods Labs (ATMLs)
and Research Groups (POF4-511)},
pid = {G:(DE-HGF)POF4-5112},
typ = {PUB:(DE-HGF)6},
doi = {10.34734/FZJ-2025-01834},
url = {https://juser.fz-juelich.de/record/1040320},
}
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