English

A criterion for finite rank $\lambda$-Toeplitz operators

Functional Analysis 2014-04-11 v1

Abstract

Let λ\lambda be a complex number in the closed unit disc D\overline{\Bbb D}, and H\cal H be a separable Hilbert space with the orthonormal basis, say, E={en:n=0,1,2,}{\cal E}=\{e_n:n=0,1,2,\cdots\}. A bounded operator TT on H\cal H is called a λ\lambda-Toeplitz operator if Tem+1,en+1=λTem,en \langle Te_{m+1},e_{n+1}\rangle=\lambda\langle Te_m,e_n\rangle (where ,\langle\cdot,\cdot\rangle is the inner product on H\cal H). The subject arises naturally from a special case of the operator equation S^*AS=\lambda A+B,\ \mbox{where $S$ is a shift on $\cal H$}, which plays an essential role in finding bounded matrix (aij)(a_{ij}) on l2(Z)l^2(\Bbb Z) that solves the system of equations {a2i,2j=pij+aaija2i,2j1=qij+baija2i1,2j=vij+caija2i1,2j1=wij+daij \left\{\begin{array}{lcc} a_{2i,2j}&=&p_{ij}+aa_{ij}\\ a_{2i,2j-1}&=&q_{ij}+ba_{ij}\\ a_{2i-1,2j}&=&v_{ij}+ca_{ij}\\ a_{2i-1,2j-1}&=&w_{ij}+da_{ij} \end{array}\right. for all i,jZi,j\in\Bbb Z, where (pij)(p_{ij}), (qij)(q_{ij}), (vij)(v_{ij}), (wij)(w_{ij}) are bounded matrices on l2(Z)l^2(\Bbb Z) and a,b,c,dCa,b,c,d\in\Bbb C. It is also clear that the well-known Toeplitz operators are precisely the solutions of SAS=AS^*AS=A, when SS is the unilateral shift. In this paper we verify some basic issues, such as boundedness and compactness, for λ\lambda-Toeplitz operators and, our main result is to give necessary and sufficient conditions for finite rank λ\lambda-Toeplitz operators.

Keywords

Cite

@article{arxiv.1404.2700,
  title  = {A criterion for finite rank $\lambda$-Toeplitz operators},
  author = {Mark C. Ho},
  journal= {arXiv preprint arXiv:1404.2700},
  year   = {2014}
}
R2 v1 2026-06-22T03:47:37.932Z