English

Partitewise Entanglement

Quantum Physics 2025-12-01 v7

Abstract

It is known that ρAB\rho^{AB} as a bipartite reduced state of the 3-qubit GHZ state is separable, but part AA and part BB indeed ``share tripartite entanglement'' in the GHZ state. Namely, whether a state can ``share'' more entanglement is dependent on the global system it lives in. Here we explore such kind of entanglement in any nn-partite system with arbitrary dimensions, n3n\geqslant3, and call it partitewise entanglement (PWE) which includes pairwise entanglement (PE) proposed in [Phys. Rev. A 110, 032420(2024)] as a special case. We propose three classes of the partitewise entanglement measures which are based on the genuine entanglement measure, the minimal bipartition, and the minimal distance from the partitewise separable states, respectively. The former two methods are far-ranging since all of them are defined by the reduced function. Consequently, we establish the framework of the resource theory of the partitewise entanglement. In addition, we investigate the partitewise entanglement extensibility and give a measure of such extensibility, and from which we find that the maximal partitewise entanglement extension is its purification. At last, the relation between this extensibility and the partitewise entanglement is discussed.

Keywords

Cite

@article{arxiv.2505.13226,
  title  = {Partitewise Entanglement},
  author = {Yu Guo and Ning Yang},
  journal= {arXiv preprint arXiv:2505.13226},
  year   = {2025}
}

Comments

The published version. Comments are welcome

R2 v1 2026-07-01T02:22:08.887Z