A criterion for finite rank $\lambda$-Toeplitz operators
Abstract
Let be a complex number in the closed unit disc , and be a separable Hilbert space with the orthonormal basis, say, . A bounded operator on is called a -Toeplitz operator if (where is the inner product on ). 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 on that solves the system of equations for all , where , , , are bounded matrices on and . It is also clear that the well-known Toeplitz operators are precisely the solutions of , when is the unilateral shift. In this paper we verify some basic issues, such as boundedness and compactness, for -Toeplitz operators and, our main result is to give necessary and sufficient conditions for finite rank -Toeplitz operators.
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}
}