Quantum marginal inequalities and the conjectured entropic inequalities
arXiv:1305.2023 · doi:10.1007/s10773-014-2093-x
Abstract
A conjecture -- \emph{the modified super-additivity inequality} of relative entropy -- was proposed in \cite{Zhang2012}: There exist three unitary operators $U_A\in \unitary{\cH_A},U_B\in \unitary{\cH_B}$, and $U_{AB}\in \unitary{\cH_A\ot \cH_B}$ such that $$ \rS(U_{AB}Ï_{AB}U^\dagger_{AB}||Ï_{AB}) \geqslant \rS(U_AÏ_AU^\dagger_A||Ï_A) + \rS(U_BÏ_BU^\dagger_B||Ï_B), $$ where the reference state $Ï$ is required to be full-ranked. A numerical study on the conjectured inequality is conducted in this note. The results obtained indicate that the modified super-additivity inequality of relative entropy seems to hold for all qubit pairs.
Published version, 10 pages, 8 fig. The title is changed