English

Dunkl--Williams inequality for operators \\ associated with $p$-angular distance

Operator Algebras 2012-03-22 v1 Functional Analysis

Abstract

We present several operator versions of the Dunkl--Williams inequality with respect to the pp-angular distance for operators. More precisely, we show that if A,BB(H)A, B \in \mathbb{B}(\mathscr{H}) such that A|A| and B|B| are invertible, 1r+1s=1(r>1)\frac{1}{r}+\frac{1}{s}=1\,\,(r>1) and pRp\in\mathbb{R}, then \begin{equation*} |A|A|^{p-1}-B|B|^{p-1}|^{2} \leq |A|^{p-1}(r|A-B|^{2}+s||A|^{1-p}|B|^{p}-|B||^2)|A|^{p-1}.%\nonumber \end{equation*} In the case that 0<p10<p \leq 1, we remove the invertibility assumption and show that if A=UAA=U|A| and B=VBB=V|B| are the polar decompositions of AA and BB, respectively, t>0t>0, then (UApVBp)A1p2(1+t)AB2+(1+1t)BpA1pB2.|(U|A|^{p}-V|B|^{p})|A|^{1-p}|^{2}\leq (1+t)|A-B|^{2}+(1+\frac{1}{t})||B|^{p}|A|^{1-p}-|B||^2 \,. We obtain several equivalent conditions, when the case of equalities hold.

Keywords

Cite

@article{arxiv.1006.1941,
  title  = {Dunkl--Williams inequality for operators \\ associated with $p$-angular distance},
  author = {F. Dadipour and M. Fujii and M. S. Moslehian},
  journal= {arXiv preprint arXiv:1006.1941},
  year   = {2012}
}

Comments

11 pages, to appear in Nihonkai Math J

R2 v1 2026-06-21T15:34:15.133Z