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Typical entanglement entropy in the presence of a center: Page curve and its variance

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arxiv 1904.08370 v3 pith:3RI6TN4N submitted 2019-04-17 hep-th cond-mat.stat-mechgr-qc

Typical entanglement entropy in the presence of a center: Page curve and its variance

classification hep-th cond-mat.stat-mechgr-qc
keywords entropyentanglementcenteraverageformulatypicalvarianceexact
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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In a quantum system in a pure state, a subsystem generally has a nonzero entropy because of entanglement with the rest of the system. Is the average entanglement entropy of pure states also the typical entropy of the subsystem? We present a method to compute the exact formula of the momenta of the probability $P(S_A) \mathrm{d}S_A$ that a subsystem has entanglement entropy $S_A$. The method applies to subsystems defined by a subalgebra of observables with a center. In the case of a trivial center, we reobtain the well-known result for the average entropy and the formula for the variance. In the presence of a nontrivial center, the Hilbert space does not have a tensor product structure and the well-known formula does not apply. We present the exact formula for the average entanglement entropy and its variance in the presence of a center. We show that for large systems the variance is small, $\Delta S_A/\langle{S_{A}}\rangle\ll 1$, and therefore the average entanglement entropy is typical. We compare exact and numerical results for the probability distribution and comment on the relation to previous results on concentration of measure bounds. We discuss the application to physical systems where a center arises. In particular, for a system of noninteracting spins in a magnetic field and for a free quantum field, we show how the thermal entropy arises as the typical entanglement entropy of energy eigenstates.

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Cited by 3 Pith papers

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

  1. Typical entanglement entropy with charge conservation

    quant-ph 2026-04 unverdicted novelty 7.0

    Typical entanglement entropy with fixed global charge is given by the local thermal entropy at fixed charge density for both U(1) and SU(2) symmetries in the thermodynamic limit.

  2. Channel-State duality with centers

    quant-ph 2024-04 unverdicted novelty 5.0

    Generalizes channel-state duality to algebras with centers, establishing a link between state non-separability and channel isometry, plus extension to infinite-dimensional trace-class operators.

  3. A note on Bianchi-Don\`a's proof to the variance formula of von Neumann entropy

    cs.IT 2019-06 unverdicted novelty 1.0

    Bianchi and Donà's proof of the von Neumann entropy variance formula uses the same subsequent calculations as the earlier proof in reference [3].