% IMPORTANT: The following is UTF-8 encoded. This means that in the presence
% of non-ASCII characters, it will not work with BibTeX 0.99 or older.
% Instead, you should use an up-to-date BibTeX implementation like “bibtex8” or
% “biber”.
@ARTICLE{Harris:1045757,
author = {Harris, Isaac and Kleefeld, Andreas and Lee, Heejin},
title = {{O}n the transmission eigenvalues for scattering by a
clamped planar region},
journal = {Inverse problems and imaging},
volume = {21},
number = {0},
issn = {1930-8337},
publisher = {AIMS},
reportid = {FZJ-2025-03588},
pages = {152-172},
year = {2026},
abstract = {In this paper, we consider a new transmission eigenvalue
problem derived from the scattering by a clamped cavity in a
thin elastic material. Scattering in a thin elastic material
can be modeled by the Kirchhoff–Love infinite plate
problem. This results in a biharmonic scattering problem
that can be handled by operator splitting. The main novelty
of this transmission eigenvalue problem is that it is posed
in all of $\mathbb{R}^2$. This adds analytical and
computational difficulties in studying this eigenvalue
problem. Here, we prove that the eigenvalues can be
recovered from the far field data as well as discreteness of
the transmission eigenvalues. We provide some numerical
experiments via boundary integral equations to demonstrate
the theoretical results. We also conjecture monotonicity
with respect to the measure of the scatterer from our
numerical experiments.},
cin = {JSC},
ddc = {510},
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)16},
UT = {WOS:001562637800001},
doi = {10.3934/ipi.2025038},
url = {https://juser.fz-juelich.de/record/1045757},
}
Gast ::