English

Fuglede-Putnam type theorems via the Aluthge transform

Functional Analysis 2013-04-02 v1 Operator Algebras

Abstract

Let A=UAA=U|A| and B=VBB=V|B| be the polar decompositions of AB(H1)A\in \mathbb{B}(\mathscr{H}_1) and BB(H2)B\in \mathbb{B}(\mathscr{H}_2) and let Com(A,B)Com(A,B) stand for the set of operators XB(H2,H1)X\in\mathbb{B}(\mathscr{H}_2,\mathscr{H}_1) such that AX=XBAX=XB. A pair (A,B)(A,B) is said to have the FP-property if Com(A,B)\subseteqCom(A,B)Com(A,B)\subseteqCom(A^\ast,B^\ast). Let C~\tilde{C} denote the Aluthge transform of a bounded linear operator CC. We show that (i) if AA and BB are invertible and (A,B)(A,B) has the FP-property, then so is (A~,B~)(\tilde{A},\tilde{B}); (ii) if AA and BB are invertible, the spectrums of both UU and VV are contained in some open semicircle and (A~,B~)(\tilde{A},\tilde{B}) has the FP-property, then so is (A,B)(A,B); (iii) if (A,B)(A,B) has the FP-property, then Com(A,B)\subseteqCom(A~,B~)Com(A,B)\subseteqCom(\tilde{A},\tilde{B}), moreover, if AA is invertible, then Com(A,B)=Com(A~,B~)Com(A,B)=Com(\tilde{A},\tilde{B}). Finally, if Re(UA12)a>0Re(U|A|^{1\over2})\geq a>0 and Re(VB12)a>0Re(V|B|^{1\over2})\geq a>0 and XX is an operator such that UX=XVU^* X=XV, then we prove that A~XXB~p2aB12XXB12p\|\tilde{A}^* X-X\tilde{B}\|_p\geq 2a\|\,|B|^{1\over2}X-X|B|^{1\over2}\|_p for any 1p1 \leq p \leq \infty.

Keywords

Cite

@article{arxiv.1112.1302,
  title  = {Fuglede-Putnam type theorems via the Aluthge transform},
  author = {M. S. Moslehian and S. M. S. Nabavi Sales},
  journal= {arXiv preprint arXiv:1112.1302},
  year   = {2013}
}

Comments

13 pages; to appear in Positivity

R2 v1 2026-06-21T19:47:14.503Z