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Some inverse problems associated with Hill operator

Spectral Theory 2015-04-27 v1

Abstract

Let lnl_{n} be the length of the nn-th instability interval of the Hill operator Ly=y+q(x)yLy=-y^{\prime\prime}+q(x)y. We obtain that if ln=o(n2)l_{n}=o(n^{-2}) then cn=o(n2)c_{n}=o(n^{-2}), where cnc_{n} are the Fourier coefficients of qq. Using this inverse result, we prove: Let ln=o(n2)l_{n}=o(n^{-2}). If \{(n\pi)^{2}: \textrm{nevenand even and n>n_{0}}\} is a subset of the periodic spectrum of Hill operator then q=0q=0 a.e., where n0n_{0} is a positive large number such that ln<εn2l_{n}<\varepsilon n^{-2} for all n>n0(ε)n>n_{0}(\varepsilon) with some ε>0\varepsilon>0. A similar result holds for the anti-periodic case.

Cite

@article{arxiv.1504.06547,
  title  = {Some inverse problems associated with Hill operator},
  author = {Alp Arslan Kirac},
  journal= {arXiv preprint arXiv:1504.06547},
  year   = {2015}
}
R2 v1 2026-06-22T09:22:11.381Z