Pure state entanglement and von Neumann algebras
- URL: http://arxiv.org/abs/2409.17739v1
- Date: Thu, 26 Sep 2024 11:13:47 GMT
- Title: Pure state entanglement and von Neumann algebras
- Authors: Lauritz van Luijk, Alexander Stottmeister, Reinhard F. Werner, Henrik Wilming,
- Abstract summary: We develop the theory of local operations and classical communication (LOCC) for bipartite quantum systems represented by commuting von Neumann algebras.
Our theorem implies that, in a bipartite system modeled by commuting factors in Haag duality, a) all states have infinite one-shot entanglement if and only if the local factors are not of type I.
In the appendix, we provide a self-contained treatment of majorization on semifinite von Neumann algebras and $sigma$-finite measure spaces.
- Score: 41.94295877935867
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We develop the theory of local operations and classical communication (LOCC) for bipartite quantum systems represented by commuting von Neumann algebras. Our central result is the extension of Nielsen's Theorem to arbitrary factors. As in the matrix algebra case, the LOCC ordering of bipartite pure states is connected to the majorization of their restrictions. Our theorem implies that, in a bipartite system modeled by commuting factors in Haag duality, a) all states have infinite one-shot entanglement if and only if the local factors are not of type I, b) type III factors are characterized by LOCC transitions of arbitrary precision between any two pure states, and c) the latter holds even without classical communication for type III$_{1}$ factors. In the case of semifinite factors, the usual construction of entanglement monotones carries over using majorization theory. In the appendix, we provide a self-contained treatment of majorization on semifinite von Neumann algebras and $\sigma$-finite measure spaces.
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