English

Projection methods for discrete Schrodinger operators

Spectral Theory 2007-05-23 v2

Abstract

Let HH be the discrete Schr\"odinger operator Hu(n):=u(n1)+u(n+1)+v(n)u(n)Hu(n):=u(n-1)+u(n+1)+v(n)u(n), u(0)=0u(0)=0 acting on l2(Z+)l^2({\bf Z}^+) where the potential vv is real-valued and v(n)0v(n)\to 0 as nn\to \infty. Let PP be the orthogonal projection onto a closed linear subspace Ll2(Z+)L \subset l^2({\bf Z}^+). In a recent paper E.B. Davies defines the second order spectrum Spec2(H,L){\rm Spec}_2(H,L) of HH relative to LL as the set of zCz \in {\bf C} such that the restriction to LL of the operator P(Hz)2PP(H-z)^2P is not invertible within the space LL. The purpose of this article is to investigate properties of Spec2(H,L){\rm Spec}_2(H,L) when LL is large but finite dimensional. We explore in particular the connection between this set and the spectrum of HH. Our main result provides sharp bounds in terms of the potential vv for the asymptotic behaviour of Spec2(H,L){\rm Spec}_2(H,L) as LL increases towards l2(Z+)l^2({\bf Z}^+).

Keywords

Cite

@article{arxiv.math/0201227,
  title  = {Projection methods for discrete Schrodinger operators},
  author = {Lyonell S. Boulton},
  journal= {arXiv preprint arXiv:math/0201227},
  year   = {2007}
}

Comments

24 pages, 5 figures, the version 2 contains some corrections in section 4