A note on some inequalities for positive linear maps

Abstract

We improve and generalize some operator inequalities for positive linear maps. It is shown, among other inequalities, that if 0<m B m'<M' A M or 0<m A m'<M' B M, then for each 2 p<∞ and ∈ [ 0,1 ], equation* p( A∇ B ) ( K( h )42p-1Kr( h' ) )p p( A\# B ), equation* and equation* p( A∇ B ) ( K( h )42p-1Kr( h' ) )p( ( A )\# ( B ) )p, equation* where r= \ ,1- \, h=Mm and h'=M'm'. We also obtain an improvement of operator P\'olya-Szeg\"o inequality.