English

Numerical Range Inclusion, Dilation, and Operator Systems

Functional Analysis 2019-11-05 v1

Abstract

Researchers have identified complex matrices AA such that a bounded linear operator BB acting on a Hilbert space will admit a dilation of the form AIA \otimes I whenever the numerical range inclusion relation W(B)W(A)W(B) \subseteq W(A) holds. Such an operator AA and the identity matrix will span a maximal operator system, i.e., every unital positive map from span{I,A,A}{\rm span} \{I, A, A^*\} to B(H){\cal B}({\cal H}), the algebra of bounded linear operators acting on a Hilbert space H{\cal H}, is completely positive. In this paper, we identify mm-tuple of matrices A=(A1,,Am){\bf A} = (A_1, \dots, A_m) such that any mm-tuple of operators B=(B1,,Bm){\bf B} = (B_1, \dots, B_m) satisfying the joint numerical range inclusion W(B)convW(A)W({\bf B}) \subseteq {\rm conv} W({\bf A}) will have a joint dilation of the form (A1I,,AmI)(A_1\otimes I, \dots, A_m\otimes I). Consequently, every unital positive map from span{I,A1,A1,,Am,Am}{\rm span} \{I, A_1, A_1^*, \dots, A_m, A_m^*\} to B(H){\cal B}({\cal H}) is completely positive. New results and techniques are obtained relating to the study of numerical range inclusion, dilation, and maximal operator systems.

Keywords

Cite

@article{arxiv.1911.01221,
  title  = {Numerical Range Inclusion, Dilation, and Operator Systems},
  author = {Chi-Kwong Li and Yiu-Tung Poon},
  journal= {arXiv preprint arXiv:1911.01221},
  year   = {2019}
}

Comments

13 pages, 3 figures

R2 v1 2026-06-23T12:04:03.181Z