English

Subadditive inequalities for operators

Functional Analysis 2019-04-29 v1

Abstract

In this article, we present a new subadditivity behavior of convex and concave functions, when applied to Hilbert space operators. For example, under suitable assumptions on the spectrum of the positive operators AA and BB, we prove that 21r(A+B)rAr+Br for r>1 and r<0,{{2}^{1-r}}{{\left( A+B \right)}^{r}}\le {{A}^{r}}+{{B}^{r}}\quad\text{ for }r>1\text{ and }r<0, and Ar+Br21r(A+B)r for r[0,1].{{A}^{r}}+{{B}^{r}}\le {{2}^{1-r}}{{\left( A+B \right)}^{r}}\quad\text{ for }r\in \left[ 0,1 \right]. These results provide considerable generalization of earlier results by Aujla and Silva. Further, we present several extensions of the subadditivity idea initiated by Ando and Zhan, then extended by Bourin and Uchiyama.

Keywords

Cite

@article{arxiv.1904.11880,
  title  = {Subadditive inequalities for operators},
  author = {Hamid Reza Moradi and Zahra Heydarbeygi and Mohammad Sababheh},
  journal= {arXiv preprint arXiv:1904.11880},
  year   = {2019}
}

Comments

Accepted in MIA

R2 v1 2026-06-23T08:50:34.256Z