English

The operator system of Toeplitz matrices

Functional Analysis 2021-06-08 v3 Operator Algebras

Abstract

A recent paper of A.~Connes and W.D.~van Suijlekom identifies the operator system of n×nn\times n Toeplitz matrices with the dual of the space of all trigonometric polynomials of degree less than nn. The present paper examines this identification in somewhat more detail by showing explicitly that the Connes--van Suijlekom isomorphism is a unital complete order isomorphism of operator systems. Consequences of this complete order isomorphism are also examined, yielding two special results of note: (i) that every positive linear map of the n×nn\times n complex matrices is completely positive when restricted to the operator subsystem of Toeplitz matrices and (ii) that every linear unital isometry of the n×nn\times n Toeplitz matrices into the algebra of all n×nn\times n complex matrices is a unitary similarity transformation. This latter result gives a new proof of a theorem established earlier. An operator systems approach to Toeplitz matrices yields new insights into the positivity of block Toeplitz matrices, which are viewed herein as elements of tensor product spaces of an arbitrary operator system with the operator system of n×nn\times n complex Toeplitz matrices. In particular, it is shown that min and max positivity are distinct if the blocks themselves are Toeplitz matrices, and that the maximally entangled Toeplitz matrix generates an extremal ray in the cone of all continuous n×nn\times n Toeplitz-matrix valued functions ff on the unit circle S1S^1 whose Fourier coffecients f^(k)\hat f(k) vanish for kn|k|\geq n .

Keywords

Cite

@article{arxiv.2103.16546,
  title  = {The operator system of Toeplitz matrices},
  author = {Douglas Farenick},
  journal= {arXiv preprint arXiv:2103.16546},
  year   = {2021}
}

Comments

*** Notational issues corrected in this version

R2 v1 2026-06-24T00:42:13.463Z