English

Douglas factorization theorem revisited

Operator Algebras 2021-07-23 v3

Abstract

Inspired by the Douglas lemma, we investigate the solvability of the operator equation AX=CAX=C in the framework of Hilbert C*-modules. Utilizing partial isometries, we present its general solution when AA is a semi-regular operator. For such an operator AA, we show that the equation AX=CAX=C has a positive solution if and only if the range inclusion R(C)R(A){\mathcal R}(C) \subseteq {\mathcal R}(A) holds and CCtCACC^*\le t\, CA^* for some t>0t>0. In addition, we deal with the solvability of the operator equation (P+Q)1/2X=P(P+Q)^{1/2}X=P, where PP and QQ are projections. We provide a counterexample to show that there exists a CC^*-algebra A\mathfrak{A}, a Hilbert A\mathfrak{A}-module H\mathscr{H} and projections PP and QQ on H\mathscr{H} such that the operator equation (P+Q)1/2X=P(P+Q)^{1/2}X=P has no solution. Moreover, we give a perturbation result related to the latter equation.

Keywords

Cite

@article{arxiv.1807.00579,
  title  = {Douglas factorization theorem revisited},
  author = {Vladimir Manuilov and Mohammad Sal Moslehian and Qingxiang Xu},
  journal= {arXiv preprint arXiv:1807.00579},
  year   = {2021}
}

Comments

14 pages, title changed, final version

R2 v1 2026-06-23T02:47:57.701Z