Unextendible product bases and locally unconvertible bound entangled states
arXiv:quant-ph/0310172
Abstract
Mutual convertibility of bound entangled states under local quantum operations and classical communication (LOCC) is studied. We focus on states associated with unextendible product bases (UPB) in a system of three qubits. A complete classification of such UPBs is suggested. We prove that for any pair of UPBs $S$ and $T$ the associated bound entangled states $Ï_S$ and $Ï_T$ can not be converted to each other by LOCC, unless $S$ and $T$ coincide up to local unitaries. More specifically, there exists a finite precision $ε>0$ such that for any LOCC protocol mapping $Ï_S$ into a probabilistic ensemble $(p_j,Ï_j)$, the fidelity between $Ï_T$ and any possible final state $Ï_j$ is smaller than $1-ε$.
REVTeX, 9 pages, 2 figures