Some refinements of young type inequality for positive linear map

Abstract: We obtain a refined Young type inequality in this paper. The conclusion is presented as follows: Let A, B ∈ B(𝓗) be two positive operators and p ∈ [0, 1], then $$\begin{array}{} \displaystyle A\sharp_p B+G^*(A\sharp_p B)G\le A\nabla_p B-2r(A\nabla B-A\sharp B), \end{array}$$ where r = min{p, 1 – p}, G = $\begin{array}{} \displaystyle \frac{\sqrt{L(2p)}}{2} \end{array}$ A–1S(A|B), L(t) is periodic with period one and L(t) = $\begin{array}{} \displaystyle \frac{t^2}{2}\left( \frac{1-t}{t} \right)^{2t} \end{a… Show more

“…words, our results can be regarded as further refinements of reversed AM-GM operator inequalities of [12].…”

“…Firstly, we give some further refinements of the corresponding results in [12] for scalars and Hilbert-Schmidt norms. Before that, we state a lemma.…”

“…being a unital positive linear map. Recently, Yang et al [12] gave some further refinements to the above:…”

Further refinements of reversed AM–GM operator inequalities

“…words, our results can be regarded as further refinements of reversed AM-GM operator inequalities of [12].…”

“…Firstly, we give some further refinements of the corresponding results in [12] for scalars and Hilbert-Schmidt norms. Before that, we state a lemma.…”

“…being a unital positive linear map. Recently, Yang et al [12] gave some further refinements to the above:…”

Further refinements of reversed AM–GM operator inequalities

Some Refinements of the Improved Young and Its Reverse Inequalities

Some results of Young-type inequalities