English

A note on some inequalities for positive linear maps

Functional Analysis 2017-07-25 v3

Abstract

We improve and generalize some operator inequalities for positive linear maps. It is shown, among other inequalities, that if 0<mBm<MAM0<m\le B\le m'<M'\le A\le M or 0<mAm<MBM0<m\le A\le m'<M'\le B\le M, then for each 2p<2\le p<\infty and ν[0,1]\nu \in \left[ 0,1 \right], \begin{equation*} {{\Phi }^{p}}\left( A{{\nabla }_{\nu }}B \right)\le {{\left( \frac{K\left( h \right)}{{{4}^{\frac{2}{p}-1}}{{K}^{r}}\left( h' \right)} \right)}^{p}}{{\Phi }^{p}}\left( A{{\#}_{\nu }}B \right), \end{equation*} and \begin{equation*} {{\Phi }^{p}}\left( A{{\nabla }_{\nu }}B \right)\le {{\left( \frac{K\left( h \right)}{{{4}^{\frac{2}{p}-1}}{{K}^{r}}\left( h' \right)} \right)}^{p}}{{\left( \Phi \left( A \right){{\#}_{\nu }}\Phi \left( B \right) \right)}^{p}}, \end{equation*} where r=min{ν,1ν}r=\min \left\{ \nu ,1-\nu \right\}, h=Mmh=\frac{M}{m} and h=Mmh'=\frac{M'}{m'}. We also obtain an improvement of operator P\'olya-Szeg\"o inequality.

Keywords

Cite

@article{arxiv.1701.03428,
  title  = {A note on some inequalities for positive linear maps},
  author = {H. R. Moradi and M. E. Omidvar and I. H. Gümüş and R. Naseri},
  journal= {arXiv preprint arXiv:1701.03428},
  year   = {2017}
}

Comments

to appear in Linear Multilinear Algebra

R2 v1 2026-06-22T17:48:54.216Z