Some reversed and refined Callebaut inequalities via Kontorovich constant

Abstract

In this paper we employ some operator techniques to establish some refinements and reverses of the Callebaut inequality involving the geometric mean and Hadamard product under some mild conditions. In particular, we show align* K&(M2t-1m2t-1,2)r' Σj=1n(AjsBj) Σj=1n(Aj1-sBj) \\&\,\,+(t-st-1/2)(Σj=1n(AjtBj) Σj=1n(Aj1-tBj) -Σj=1n(Aj Bj) Σj=1n(Aj Bj)) \\&≤ Σj=1n(AjtBj) Σj=1n(Aj1-t Bj)\,, align* where Aj, Bj∈ B( H)\,\,(1≤ j≤ n) are positive operators such that 0<m' ≤ Bj≤ m <M ≤ Aj≤ M'\,\,(1≤ j≤ n), either 1≥ t≥ s>12 or 0≤ t≤ s<12, r'=\t-st-1/2,s-1/2t-1/2\ and K(t,2)=(t+1)24t\,\,(t>0).