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Entanglement measures and their properties in quantum field theory

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arxiv 1702.04924 v3 pith:4Y5Q2LY4 submitted 2017-02-16 quant-ph gr-qchep-thmath-phmath.MP

Entanglement measures and their properties in quantum field theory

classification quant-ph gr-qchep-thmath-phmath.MP
keywords statesentanglementseparableentropyquantumstatesystemsbipartite
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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An entanglement measure for a bipartite quantum system is a state functional that vanishes on separable states and that does not increase under separable (local) operations. It is well-known that for pure states, essentially all entanglement measures are equal to the v. Neumann entropy of the reduced state, but for mixed states, this uniqueness is lost. In quantum field theory, bipartite systems are associated with causally disjoint regions. There are no separable (normal) states to begin with when the regions touch each other, so one must leave a finite "safety-corridor". Due to this corridor, the normal states of bipartite systems are necessarily mixed, and the v. Neumann entropy is not a good entanglement measure in the above sense. In this paper, we study various entanglement measures which vanish on separable states, do not increase under separable (local) operations, and have other desirable properties. In particular, we study the relative entanglement entropy, defined as the minimum relative entropy between the given state and an arbitrary separable state. We establish rigorous upper and lower bounds in various quantum field theoretic (QFT) models, as well as also model-independent ones. The former include free fields on static spacetime manifolds in general dimensions, or integrable models with factorizing $S$-matrix in 1+1 dimensions. The latter include bounds on ground states in general conformal QFTs, charged states (including charges with braid-group statistics) or thermal states in theories satisfying a "nuclearity condition". Typically, the bounds show a divergent behavior when the systems get close to each other--sometimes of the form of a generalized "area law"--and decay when the systems are far apart. Our main technical tools are of operator algebraic nature.

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