A General Double Inequality Related to Operator Means and Positive Linear Maps

Abstract

Let A,B∈ B(H) be such that 0<b1I ≤ A ≤ a1I and 0<b2I ≤ B ≤ a2I for some scalars 0<bi< ai,\;\; i=1,2 and :B(H)→B(K) be a positive linear map. We show that for any operator mean σ with the representing function f, the double inequality ω1-α((A)#α(B)) (ω(A))∇α(B)≤ αμ(Aσ B) holds, where μ=a1b1(f(b2a1-1)-f(a2b1-1))b1b2-a1a2, =a1a2f(b2a1-1)-b1b2f(a2b1-1)a1a2-b1b2, ω=α (1-α)μ and #α (∇α, resp.) is the weighted geometric (arithmetic, resp.) mean for α ∈ (0,1). As applications, we present several generalized operator inequalities including Diaz--Metcalf and reverse Ando type inequalities. We also give some related inequalities involving Hadamard product and operator means.