English

Jacobi matrices: continued fractions, approximation, spectrum

Spectral Theory 2017-08-23 v2 Functional Analysis Numerical Analysis

Abstract

In this work the spectral theory of self-adjoint operator AA represented by Jacobi matrix is considered. The approach is based on the continued fraction representation of the resolvent matrix element of AA. Different criteria of absolute continuity of a spectrum are found. For the analysis of the absolutely continuous spectrum it is used an approximation of AA by a sequence of operators AnA_n with absolutely continuous spectrum on a given interval [a,b][a,b\,] which converges to AA in a strong sense on a dense set. In the case when [a,b]σ(A)[a,b\,]\subseteq\sigma(A) it was found the sufficient condition of absolute continuity of the operator AA spectrum on [a,b][a,b\,]. This condition uses the notion of equi-absolute continuity. It is constructed the system of functions converging to the distribution function of the operator. In the case of the absolutely continuous spectrum, the system of continuous functions converging to the spectral weight of the operator on a given interval is also constructed and was analyzed. The conditions when the derivative of the distribution function of AA belongs to the class C[a,b]C[a,b\,] are also obtained.

Keywords

Cite

@article{arxiv.1707.04695,
  title  = {Jacobi matrices: continued fractions, approximation, spectrum},
  author = {Eduard Ianovich},
  journal= {arXiv preprint arXiv:1707.04695},
  year   = {2017}
}

Comments

25 pages, Published electronically: December 2015, Reported on the conference STA 2017 Krak\'ow

R2 v1 2026-06-22T20:47:45.322Z