Further refinements of the Heinz inequality
Abstract
The celebrated Heinz inequality asserts that 2|||A1/2XB1/2|||≤ |||AXB1-+A1-XB|||≤ |||AX+XB||| for X ∈ B(H), A,B∈ \+, every unitarily invariant norm |||·||| and ∈ [0,1]. In this paper, we present several improvement of the Heinz inequality by using the convexity of the function F()=|||AXB1-+A1-XB|||, some integration techniques and various refinements of the Hermite--Hadamard inequality. In the setting of matrices we prove that eqnarray* &&-0.5cm|||Aα+β2XB1-α+β2+A1-α+β2XBα+β2|||≤1|β-α| |||∫αβ(AXB1-+A1-XB)d|||\\ &&≤ 12|||AαXB1-α+A1-αXBα+AβXB1-β+A1-βXBβ|||\,, eqnarray* for real numbers α, β.
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