English

Limiting absorption principle for perturbed operator

Functional Analysis 2021-10-07 v2 Spectral Theory

Abstract

In this note the following theorem is proved. Let H\mathcal H and K\mathcal K be Hilbert spaces. Let H0H_0 be a self-adjoint operator on H,\mathcal H, F ⁣:HKF \colon \mathcal H \to \mathcal K be a closed H01/2|H_0|^{1/2}-compact operator, and J ⁣:KKJ \colon \mathcal K \to \mathcal K be a bounded self-adjoint operator. If the operator F(H0λiy)1F F (H_0 - \lambda - iy)^{-1} F^* has norm limit as y0+y \to 0^+ for a.e.~λ,\lambda, then so does the operator F(H0+FJFλiy)1F. F (H_0 + F^*JF - \lambda - iy)^{-1} F^*. An invariant operator ideal version of this result is also discussed.

Keywords

Cite

@article{arxiv.2110.01000,
  title  = {Limiting absorption principle for perturbed operator},
  author = {Nurulla Azamov},
  journal= {arXiv preprint arXiv:2110.01000},
  year   = {2021}
}

Comments

4 pages; an invariant operator ideal version of the main result has been added

R2 v1 2026-06-24T06:35:06.828Z