Entanglement wedge cross section triangle information and holographic entanglement of assistance
Abstract
We identify a non-negative and upper-bounded entanglement signal in holography which is defined as a combination of entanglement wedge cross sections (EWCS) for a tripartite mixed state ABE: EI(A:B|E) = EWCS(A:EB) + EWCS(B:EA) - EWCS(E:AB). This quantity is an analogue of conditional mutual information (CMI) and shares similar mathematical structures in both quantum information theory and holography. We show that CMI is upper bounded by a quantum information quantity, the entanglement of assistance, which quantifies the entanglement that can be generated between two parties A and B, given assistance from a third party E. We prove that EI is also upper bounded by the entanglement of assistance in the canonical purification state. We analyze its upper bound by maximizing EI(A:B|E) over all configurations of the auxiliary subsystem E in AdS3/CFT2. The maximized EI displays a rich phase structure governed by the cross ratio XAB: it vanishes below a critical threshold and, beyond a second phase transition point, saturates the bound of entanglement of assistance. We comment on the interpretation of EI as characterizing the assisted bipartite quantum entanglement between A and B with the help of E.
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