Karel Van Acoleyen, Michaël Mariën, Frank Verstraete
Published 2013-04-22, updated 2013-11-05Version 3
We prove an upper bound on the maximal rate at which a Hamiltonian interaction can generate entanglement in a bipartite system. The scaling of this bound as a function of the subsystem dimension on which the Hamiltonian acts nontrivially is optimal and is exponentially improved over previously known bounds. As an application, we show that a gapped quantum many-body spin system on an arbitrary lattice satisfies an area law for the entanglement entropy if and only if any other state with which it is adiabatically connected (i.e. any state in the same phase) also satisfies an area law.
Comments: v3: improved presentation of the SIE-proof, matching the published version
Journal: Phys. Rev. Lett. 111, 170501 (2013)
Area laws in quantum systems: mutual information and correlations
An area law for entanglement from exponential decay of correlations
Area laws from classical entropies
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