English

Total Dilations

Functional Analysis 2007-05-23 v1

Abstract

(1) Let AA be an operator on a space H{\cal H} of even finite dimension. Then for some decomposition H=FF{\cal H}={\cal F}\oplus{\cal F}^{\perp}, the compressions of AA onto F{\cal F} and F{\cal F}^{\perp} are unitarily equivalent. (2) Let {Aj}j=0n\{A_j\}_{j=0}^n be a family of strictly positive operators on a space H{\cal H}. Then, for some integer kk, we can dilate each AjA_j into a positive operator BjB_j on kH\oplus^k{\cal H} in such a way that: (i) The operator diagonal of BjB_j consists of a repetition of AjA_j. (ii) There exist a positive operator BB on kH\oplus^k{\cal H} and an increasing function fj:(0,)(0,)f_j : (0,\infty)\longrightarrow(0,\infty) such that Bj=fj(B)B_j=f_j(B).

Keywords

Cite

@article{arxiv.math/0211359,
  title  = {Total Dilations},
  author = {Jean-Christophe Bourin},
  journal= {arXiv preprint arXiv:math/0211359},
  year   = {2007}
}

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12 pages