On a Block Matrix Inequality quantifying the Monogamy of the Negativity of Entanglement

Abstract

We convert a conjectured inequality from quantum information theory, due to He and Vidal, into a block matrix inequality and prove a special case. Given n matrices Ai, i=1,…,n, of the same size, let Z1 and Z2 be the block matrices Z1:=(AjAi*)i,j=1n and Z2:=(Aj*Ai)i,j=1n. Then the conjectured inequality is \[ (||Z1||1- Z1)2 + (||Z2||1- Z2)2 (Σi≠ j ||Ai||2 ||Aj||2)2. \] We prove this inequality for the already challenging case n=2 with A1 equal to the identity matrix.