1007.4375 (Yajun Zhou)
Yajun Zhou
We study the distribution of eigenvalues for the Green operator occurring in
the scattering of electromagnetic waves by an arbitrarily shaped dielectric
medium. It is revealed that the totality of eigenvalues (counting
multiplicities) can be enumerated as a sequence $
\{\lambda_s\}_{s=1}^N,N\leq\aleph_0$, with only two possible accumulation
points $ \{0,-1/2\}$, and the following spectral series converges: $
\sum_{s=1}^N|\lambda_s|^2|1+2\lambda_s|^4<+\infty$.
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http://arxiv.org/abs/1007.4375
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