English

Estimates of complex eigenvalues and an inverse spectral problem for the transmission eigenvalue problem

Spectral Theory 2019-10-01 v3

Abstract

This work deals with the interior transmission eigenvalue problem: y+k2η(r)y=0y'' + {k^2}\eta \left( r \right)y = 0 with boundary conditions y(0)=0=y(1)sinkky(1)cosk,{y\left( 0 \right) = 0 = y'\left( 1 \right)\frac{{\sin k}}{k} - y\left( 1 \right)\cos k}, where the function η(r)\eta(r) is positive. We obtain the asymptotic distribution of non-real transmission eigenvalues under the suitable assumption for the square of the index of refraction η(r)\eta(r). Moreover, we provide a uniqueness theorem for the case 01η(r)dr>1\int_0^1\sqrt{\eta(r)}dr>1, by using all transmission eigenvalues (including their multiplicities) along with a partial information of η(r)\eta(r) on the subinterval. The relationship between the proportion of the needed transmission eigenvalues and the length of the subinterval on the given η(r)\eta(r) is also obtained.

Cite

@article{arxiv.1703.01709,
  title  = {Estimates of complex eigenvalues and an inverse spectral problem for the transmission eigenvalue problem},
  author = {Xiao-Chuan Xu and Chuan-Fu Yang and Sergey A. Buterin and Vjacheslav A. Yurko},
  journal= {arXiv preprint arXiv:1703.01709},
  year   = {2019}
}
R2 v1 2026-06-22T18:36:20.380Z