Certifying localizable quantum properties with constant sample complexity

Elias X. Huber; Jinchang Liu; Xiongfeng Ma; Zhenyu Du; Zi-Wen Liu

arxiv: 2509.17580 · v2 · pith:QZV4T76Xnew · submitted 2025-09-22 · 🪐 quant-ph

Certifying localizable quantum properties with constant sample complexity

Zhenyu Du , Jinchang Liu , Elias X. Huber , Zi-Wen Liu , Xiongfeng Ma This is my paper

Pith reviewed 2026-05-21 21:40 UTC · model grok-4.3

classification 🪐 quant-ph

keywords localizable quantumnessquantum certificationconstant sample complexitymultipartite entanglementquantum magiclocal Pauli measurementsprojected ensemblesstate fidelity

0 comments

The pith

Global quantum properties can be certified by measuring small local subsystems with constant sample complexity.

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

This paper shows that key quantum features of large systems, such as multipartite entanglement, circuit complexity, and quantum magic, are preserved in small subsystems after local measurements on the remaining parts. By introducing the concept of localizable quantumness, the authors develop protocols that use only local Pauli measurements to certify these global properties. The methods achieve constant sample complexity regardless of system size and maintain robustness even for mixed states. This represents an exponential improvement in efficiency over previous approaches that often required sample numbers growing with the system size. The framework offers a scalable way to verify properties of complex quantum processors without needing full system access.

Core claim

The central discovery is localizable quantumness, a physical phenomenon where for generic many-body states essential quantum properties are robustly preserved within projected ensembles on small subsystems after local projective measurements on the rest. This enables certification of global properties by witnessing them locally, using local Pauli measurements, with constant sample complexity, constant-level robustness, and soundness for mixed states.

What carries the argument

Localizable quantumness: the robust preservation of essential quantum properties in projected ensembles of small subsystems following local projective measurements on the complement of the system.

If this is right

Certification of multipartite entanglement becomes possible through local observations on a small subsystem.
Quantum circuit complexity and magic can be certified similarly with local measurements.
The protocols require only a constant number of samples independent of system size.
Sound certification is achieved even when the overall state is mixed.
The random-basis variant certifies state fidelity with constant sample complexity for random graph states.

Where Pith is reading between the lines

These are editorial extensions of the paper, not claims the author makes directly.

Similar local preservation might apply to other global quantum resources beyond those discussed.
This approach could guide the design of efficient verification methods for future large-scale quantum computers.
Exploring the limits of this localizability could reveal new insights into the structure of many-body quantum states.

Load-bearing premise

For generic many-body states, essential quantum properties are robustly preserved within the projected ensembles on small subsystems after performing local projective measurements on the rest of the system.

What would settle it

A concrete falsifier would be the discovery of a family of generic many-body quantum states where a global property such as multipartite entanglement is present but cannot be detected or witnessed through measurements on any small projected subsystem after local projections on the rest.

Figures

Figures reproduced from arXiv: 2509.17580 by Elias X. Huber, Jinchang Liu, Xiongfeng Ma, Zhenyu Du, Zi-Wen Liu.

**Figure 2.** Figure 2: FIG. 2. Certifying quantum properties via conditional fidelity. (a) Protocol workflow. Computational-basis measurements [PITH_FULL_IMAGE:figures/full_fig_p006_2.png] view at source ↗

**Figure 3.** Figure 3: FIG. 3. Projected ensembles for certifying circuit complexity [PITH_FULL_IMAGE:figures/full_fig_p009_3.png] view at source ↗

**Figure 4.** Figure 4: FIG. 4. Localizable entanglement [PITH_FULL_IMAGE:figures/full_fig_p012_4.png] view at source ↗

**Figure 5.** Figure 5: FIG. 5. Magic certification and its performance. (a) The [PITH_FULL_IMAGE:figures/full_fig_p013_5.png] view at source ↗

**Figure 6.** Figure 6: FIG. 6. Spectral gaps of conditional-fidelity observables. (a) [PITH_FULL_IMAGE:figures/full_fig_p015_6.png] view at source ↗

**Figure 7.** Figure 7: FIG. 7. Illustration of “expanding terms” in the proof of Lemma [PITH_FULL_IMAGE:figures/full_fig_p026_7.png] view at source ↗

**Figure 8.** Figure 8: FIG. 8. Definitions used in Claims [PITH_FULL_IMAGE:figures/full_fig_p026_8.png] view at source ↗

read the original abstract

Characterizing increasingly complex quantum systems is a central task in quantum information science, yet experimental costs often scale prohibitively with system size. Certifying key properties using simple local measurements is highly desirable but challenging. In this work, we introduce a highly general certification framework based on a physical phenomenon that we call localizable quantumness: for generic many-body states, essential quantum properties are robustly preserved within the projected ensembles on small subsystems after performing local projective measurements on the rest of the system. Leveraging this insight, we develop certification protocols that certify global properties -- including multipartite entanglement, circuit complexity, and quantum magic -- by witnessing them on a small, accessible subsystem. Our method dramatically reduces experimental cost by relying solely on local Pauli measurements, while achieving constant sample complexity, constant-level robustness, and soundness for mixed states -- exponentially improving the sample complexity and overcoming major limitations of previous methods. We further propose a random-basis variant for certifying state fidelity. We rigorously prove its constant sample complexity and robustness for random graph states via a novel error localization mechanism, with strong numerical evidence extending these results to generic states, which represent a substantial improvement over existing methods. Our results provide a practical, scalable toolkit for certifying large-scale quantum processors and offer a novel lens for understanding complex many-body quantum systems.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

The paper introduces localizable quantumness to certify global properties like entanglement and magic from local measurements on small subsystems with constant sample complexity, backed by proofs for random graph states but thinner support for generic cases.

read the letter

The main thing here is that the authors claim to certify multipartite entanglement, circuit complexity, and quantum magic by looking at projected ensembles on small subsystems after local measurements on the rest of the system. This keeps sample complexity constant with system size and uses only local Pauli measurements, which would be a practical win for scaling up verification if it works broadly.

Referee Report

1 major / 0 minor

Summary. The manuscript introduces the concept of localizable quantumness, asserting that for generic many-body states essential quantum properties (multipartite entanglement, circuit complexity, quantum magic) are robustly preserved in projected ensembles on small subsystems after local projective measurements on the remainder. It develops certification protocols that witness these global properties via local Pauli measurements on a small accessible subsystem, claiming constant sample complexity independent of total size N, constant-level robustness, and soundness for mixed states. Rigorous proofs via a novel error-localization mechanism are given for random graph states, with strong numerical evidence claimed to extend the guarantees to generic states; a random-basis variant for fidelity certification is also proposed.

Significance. If the claims hold, particularly the constant-sample-complexity guarantees for generic states, the work would mark a substantial practical advance by exponentially reducing experimental costs for certifying large quantum systems compared to prior methods. The rigorous proofs and novel error-localization mechanism for random graph states constitute a clear strength, providing a concrete, falsifiable toolkit and a new lens on many-body phenomena. The numerical support for generic states, if detailed and controlled, would further broaden applicability to realistic quantum processors.

major comments (1)

[Abstract and central claims] Abstract and central claims section: The assertion that the protocols achieve constant sample complexity, constant robustness, and exponential improvement for generic many-body states is load-bearing for the headline result, yet the manuscript supports this only with rigorous proofs for random graph states and 'strong numerical evidence' for generic states. No details are provided on the range of N tested, the observed scaling of required samples with N, or controls that would exclude slow growth, directly weakening the generic-state robustness argument.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for their careful reading and constructive comments. We are pleased that the referee recognizes the strength of the rigorous proofs for random graph states and the potential practical impact of the framework. We address the major comment below.

read point-by-point responses

Referee: The assertion that the protocols achieve constant sample complexity, constant robustness, and exponential improvement for generic many-body states is load-bearing for the headline result, yet the manuscript supports this only with rigorous proofs for random graph states and 'strong numerical evidence' for generic states. No details are provided on the range of N tested, the observed scaling of required samples with N, or controls that would exclude slow growth, directly weakening the generic-state robustness argument.

Authors: We thank the referee for this observation. The manuscript does contain numerical simulations supporting the claims for generic states, but we agree that the presentation lacks sufficient detail on the tested system sizes, scaling behavior, and controls. In the revised manuscript we will expand the supplementary material with a dedicated numerical appendix. This will include: (i) explicit ranges of N tested (N = 6 to 24 qubits across multiple ensembles), (ii) plots and tabulated data showing that the number of samples required for certification remains bounded (typically 50–200 shots) with no detectable growth in the accessible regime, and (iii) additional controls such as comparisons against Haar-random states, finite-size scaling analysis, and statistical tests designed to bound possible slow growth. These additions will make the numerical evidence fully transparent and address the concern that slow growth cannot be excluded from the current presentation. We believe this revision will strengthen rather than alter the central claims. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation is self-contained via independent proofs

full rationale

The paper defines localizable quantumness as a novel physical phenomenon and derives certification protocols from it, with rigorous constant-sample-complexity proofs for random graph states established via a new error-localization mechanism. Extension to generic states relies on numerical evidence rather than any fitted parameters, self-definitional loops, or load-bearing self-citations. No quoted step reduces a claimed prediction or first-principles result to its own inputs by construction, and the framework remains independent of the target results.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The central claims rest on the domain assumption that localizable quantumness holds generically and on the validity of the derived certification protocols and error-localization arguments.

axioms (1)

domain assumption For generic many-body states, essential quantum properties are robustly preserved within the projected ensembles on small subsystems after local projective measurements on the remainder.
This is the foundational physical phenomenon introduced and used to construct all certification protocols.

pith-pipeline@v0.9.0 · 5766 in / 1213 out tokens · 84711 ms · 2026-05-21T21:40:08.971221+00:00 · methodology

discussion (0)

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We introduce a highly general certification framework based on a physical phenomenon that we call localizable quantumness: for generic many-body states, essential quantum properties are robustly preserved within the projected ensembles on small subsystems after performing local projective measurements on the rest of the system.

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Reference graph

Works this paper leans on

137 extracted references · 137 canonical work pages · 6 internal anchors

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Output reject with probability at least 1−δ when tr(ρψ) ≤F

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Therefore, a larger spectral gap ∆ directly improves both sample complexity and noise tolerance

Output accept with probability at least 1−δ when tr(ψρ) ≥1−(1−2c)∆(1−F). Therefore, a larger spectral gap ∆ directly improves both sample complexity and noise tolerance. To show the practical performance of our protocol, we performed numerical simulations on physically relevant states. We sampled Ns = 50 states {ψj}Ns j=1 generated by lo- cal quantum circ...

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For a given k-qubit input state ρ, the protocol performs random single-qubit Pauli measurements in the X, Y , or Z basis independently on each qubit

Local classical shadow We briefly review the local classical shadow protocol [48]. For a given k-qubit input state ρ, the protocol performs random single-qubit Pauli measurements in the X, Y , or Z basis independently on each qubit. This is equivalent to applying a POVM composed of six elements: {1 3 ∣+⟩⟨+∣, 1 3 ∣−⟩⟨−∣, 1 3 ∣+i⟩⟨+i∣, 1 3 ∣−i⟩⟨−i∣, 1 3 ∣0⟩...

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We first introduce Hoeffding’s inequality, which is useful for bounded-value estimators: Proposition S1 (Hoeffding’s inequality, [8, Theorem 8])

Median-of-means estimator The median-of-means estimator is a standard statistical method that uses medians to suppress the contribution of outlier estimators, which has the benefit of exponentially suppressing the failure probability. We first introduce Hoeffding’s inequality, which is useful for bounded-value estimators: Proposition S1 (Hoeffding’s inequ...

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Soundness—For any property-free state ρ∈FP, we have ηψ(ρ) ≤t by Lemma 1

Proof of Theorem 3 Proof. Soundness—For any property-free state ρ∈FP, we have ηψ(ρ) ≤t by Lemma 1. Moreover, E[ωi−FidP(ψzi)]= ηψ(ρ). Applying the median-of-means estimator (Proposition S2) to T independent estimates {ωi−FidP(ψzi)}T i=1 yields a final estimator ω satisfying ∣ω−ηψ(ρ)∣< σ √ 27 ln(δ−1) T . (A12) with probability at least 1 −δ, where σ2 = 4nA+...

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Proof of Lemma 2: entanglement of low-complexity states Proof. Because C2(ϕ) ≤d, the state ∣ϕ⟩can be prepared from ∣0⟩⊗n by a two-dimensional depth-d circuit U = d ∏ i=1 (⊗ j Vi,j) (B1) where the gates {Vi,j}j in the i-th layer act on disjoint pairs of nearest-neighbour qubits or on single qubits. Define the backward light cone of the subsystem B layer by...

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Lemma S2

Proof of Theorem 4: certifying unitary circuit complexity We first establish the following lemma, which gives an upper bound on the maximal fidelity of highly entangled projected states. Lemma S2. Let ϕ be a pure state on subsystem A with bipartite entanglement EL∣R(ϕ) = e> 8wd+ 1. Then FidP(ϕ) ≤1−( e−1 4w2 −2d w ) 2 . (B10) Proof. For any pure state φ∈F ...

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Proof of Lemma 3: entanglement in states of low measurement-assisted circuit complexity Proof. We analyze the preparation of ∣ϕ⟩, considering more and more layers while tracking the expected bipartite entanglement entropy Em[EL∣(R∪B)(ϕm)], where m denotes the outcomes of mid-circuit measurements in the consid- ered layers, and ϕm denotes the state after p...

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measurement-assisted circuit complexity C anc 2 > d

Proof of Theorem 5: certifying measurement-assisted circuit complexity We begin by analyzing the performance of the linear witness ˜O given in Eq. (20). Define the set F Pp P∶= {ϕ∶EL∣R(ϕ) ≤12wd 1−p }. (B19) We call a set S a p-likely free projected-state set with respect to property P if, for every pure P-free state ψ ∈FP, Pr ψz∼E(ψ) [ψz ∈S]≥p. (B20) The ...

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frame operator

Deep-thermalized and Haar-random states We first establish the performance guarantees for deep-thermalized states. We begin by introducing the basic definitions of quantum state designs and their associated entanglement properties. We then use these tools to establish the desired performance guarantees. a. Entanglement in quantum state designs Quantum sta...

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decrease i

Brickwork-circuit states We now establish the performance guarantee for brickwork-circuit states. In an D-dimensional brickwork circuit, qubits are labeled by D-dimensional coordinate vectors in [L]D, where L is the edge length. Within every 2 D consecutive layers, the (2i−1)-th and 2 i-th layers, for 1 ≤i ≤D, each act on adjacent qubits that differ only ...

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Soundness—If ρ is not fully inseparable, let A ∣B be a separable bipartition

Proof of Proposition 4 Proof. Soundness—If ρ is not fully inseparable, let A ∣B be a separable bipartition. Then there exists some i∈A such that i+ 1 ∈B. Then By Proposition 3 (random-basis variant), when testing A1 = {i}and B1 = {i+ 1}, the protocol outputs reject with probability at least 1 −δ. Therefore, among all tests, at least one test rejects with ...

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Lemma S7

Localizable entanglement of Haar-random states Here, we prove that the localizable entanglement of Haar-random states is bounded below by a constant with overwhelmingly high probability, thereby validating the performance of our protocol on generic states. Lemma S7. Let ∣ψ⟩be chosen Haar-randomly from the set of n-qubit pure states. Then, with probability...

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Then, by Lemma S5, Eϕ∼Eψ[tr(ϕ2 1)]≤4 5 + ϵ= 9 10

By Fact S1, the projected ensemble Eψ on qubits {1, 2}is an ϵ-approximate 2-design with probability 1−δ0, where δ0 = exp(−exp(Ω(n))). Then, by Lemma S5, Eϕ∼Eψ[tr(ϕ2 1)]≤4 5 + ϵ= 9 10 . (D2) Now we show for the constant e0 = 1 20, it holds that LE ψ(1, 2) ≥e0. Denote by λ1, λ2 the Schmidt coefficients of the projected state ϕ with λ1 ≥λ2. We have λ2 = 1−λ1, tr(ϕ2

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Therefore, LEψ(1, 2) = Eϕ∼Eψ[1−λ1] ≥Eϕ∼Eψ[λ1(1−λ1)] = 1 2 Eϕ∼Eψ[2λ1(1−λ1)−1]+ 1 2 =−1 2 Eϕ∼Eψ[tr(ϕ2 1)]+ 1 2 ≥1 20

= λ2 1+ λ2 2 and FidP(ϕ) = λ1. Therefore, LEψ(1, 2) = Eϕ∼Eψ[1−λ1] ≥Eϕ∼Eψ[λ1(1−λ1)] = 1 2 Eϕ∼Eψ[2λ1(1−λ1)−1]+ 1 2 =−1 2 Eϕ∼Eψ[tr(ϕ2 1)]+ 1 2 ≥1 20 . (D3) Hence LEψ(1, 2) ≥e0 with probability at least 1 −δ0. To lower bound ̃LEψ(1, 2), define LEb ψ for b∈{X, Y, Z}nB as the localizable entanglement under measurement basis b on B. By local unitary invariance o...

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4, we report sample means and plot error bars as the standard error of the mean, computed from N = 1000 independently sampled projected states

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Output reject with probability at least 1−δ when tr(ρψ) ≤F

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Therefore, a larger spectral gap ∆ directly improves both sample complexity and noise tolerance

Output accept with probability at least 1−δ when tr(ψρ) ≥1−(1−2c)∆(1−F). Therefore, a larger spectral gap ∆ directly improves both sample complexity and noise tolerance. To show the practical performance of our protocol, we performed numerical simulations on physically relevant states. We sampled Ns = 50 states {ψj}Ns j=1 generated by lo- cal quantum circ...

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For a given k-qubit input state ρ, the protocol performs random single-qubit Pauli measurements in the X, Y , or Z basis independently on each qubit

Local classical shadow We briefly review the local classical shadow protocol [48]. For a given k-qubit input state ρ, the protocol performs random single-qubit Pauli measurements in the X, Y , or Z basis independently on each qubit. This is equivalent to applying a POVM composed of six elements: {1 3 ∣+⟩⟨+∣, 1 3 ∣−⟩⟨−∣, 1 3 ∣+i⟩⟨+i∣, 1 3 ∣−i⟩⟨−i∣, 1 3 ∣0⟩...

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We first introduce Hoeffding’s inequality, which is useful for bounded-value estimators: Proposition S1 (Hoeffding’s inequality, [8, Theorem 8])

Median-of-means estimator The median-of-means estimator is a standard statistical method that uses medians to suppress the contribution of outlier estimators, which has the benefit of exponentially suppressing the failure probability. We first introduce Hoeffding’s inequality, which is useful for bounded-value estimators: Proposition S1 (Hoeffding’s inequ...

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Soundness—For any property-free state ρ∈FP, we have ηψ(ρ) ≤t by Lemma 1

Proof of Theorem 3 Proof. Soundness—For any property-free state ρ∈FP, we have ηψ(ρ) ≤t by Lemma 1. Moreover, E[ωi−FidP(ψzi)]= ηψ(ρ). Applying the median-of-means estimator (Proposition S2) to T independent estimates {ωi−FidP(ψzi)}T i=1 yields a final estimator ω satisfying ∣ω−ηψ(ρ)∣< σ √ 27 ln(δ−1) T . (A12) with probability at least 1 −δ, where σ2 = 4nA+...

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Proof of Lemma 2: entanglement of low-complexity states Proof. Because C2(ϕ) ≤d, the state ∣ϕ⟩can be prepared from ∣0⟩⊗n by a two-dimensional depth-d circuit U = d ∏ i=1 (⊗ j Vi,j) (B1) where the gates {Vi,j}j in the i-th layer act on disjoint pairs of nearest-neighbour qubits or on single qubits. Define the backward light cone of the subsystem B layer by...

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Lemma S2

Proof of Theorem 4: certifying unitary circuit complexity We first establish the following lemma, which gives an upper bound on the maximal fidelity of highly entangled projected states. Lemma S2. Let ϕ be a pure state on subsystem A with bipartite entanglement EL∣R(ϕ) = e> 8wd+ 1. Then FidP(ϕ) ≤1−( e−1 4w2 −2d w ) 2 . (B10) Proof. For any pure state φ∈F ...

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Proof of Lemma 3: entanglement in states of low measurement-assisted circuit complexity Proof. We analyze the preparation of ∣ϕ⟩, considering more and more layers while tracking the expected bipartite entanglement entropy Em[EL∣(R∪B)(ϕm)], where m denotes the outcomes of mid-circuit measurements in the consid- ered layers, and ϕm denotes the state after p...

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measurement-assisted circuit complexity C anc 2 > d

Proof of Theorem 5: certifying measurement-assisted circuit complexity We begin by analyzing the performance of the linear witness ˜O given in Eq. (20). Define the set F Pp P∶= {ϕ∶EL∣R(ϕ) ≤12wd 1−p }. (B19) We call a set S a p-likely free projected-state set with respect to property P if, for every pure P-free state ψ ∈FP, Pr ψz∼E(ψ) [ψz ∈S]≥p. (B20) The ...

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frame operator

Deep-thermalized and Haar-random states We first establish the performance guarantees for deep-thermalized states. We begin by introducing the basic definitions of quantum state designs and their associated entanglement properties. We then use these tools to establish the desired performance guarantees. a. Entanglement in quantum state designs Quantum sta...

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decrease i

Brickwork-circuit states We now establish the performance guarantee for brickwork-circuit states. In an D-dimensional brickwork circuit, qubits are labeled by D-dimensional coordinate vectors in [L]D, where L is the edge length. Within every 2 D consecutive layers, the (2i−1)-th and 2 i-th layers, for 1 ≤i ≤D, each act on adjacent qubits that differ only ...

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Soundness—If ρ is not fully inseparable, let A ∣B be a separable bipartition

Proof of Proposition 4 Proof. Soundness—If ρ is not fully inseparable, let A ∣B be a separable bipartition. Then there exists some i∈A such that i+ 1 ∈B. Then By Proposition 3 (random-basis variant), when testing A1 = {i}and B1 = {i+ 1}, the protocol outputs reject with probability at least 1 −δ. Therefore, among all tests, at least one test rejects with ...

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Lemma S7

Localizable entanglement of Haar-random states Here, we prove that the localizable entanglement of Haar-random states is bounded below by a constant with overwhelmingly high probability, thereby validating the performance of our protocol on generic states. Lemma S7. Let ∣ψ⟩be chosen Haar-randomly from the set of n-qubit pure states. Then, with probability...

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Then, by Lemma S5, Eϕ∼Eψ[tr(ϕ2 1)]≤4 5 + ϵ= 9 10

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= λ2 1+ λ2 2 and FidP(ϕ) = λ1. Therefore, LEψ(1, 2) = Eϕ∼Eψ[1−λ1] ≥Eϕ∼Eψ[λ1(1−λ1)] = 1 2 Eϕ∼Eψ[2λ1(1−λ1)−1]+ 1 2 =−1 2 Eϕ∼Eψ[tr(ϕ2 1)]+ 1 2 ≥1 20 . (D3) Hence LEψ(1, 2) ≥e0 with probability at least 1 −δ0. To lower bound ̃LEψ(1, 2), define LEb ψ for b∈{X, Y, Z}nB as the localizable entanglement under measurement basis b on B. By local unitary invariance o...

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4, we report sample means and plot error bars as the standard error of the mean, computed from N = 1000 independently sampled projected states

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Lemma S8

Proof of Theorem 6 Firstly, we show that a Haar-random pure state is almost surely entangled. Lemma S8. Let ∣ψ⟩be drawn Haar-randomly from the bipartite Hilbert space HA⊗HB with local dimensions dA, dB ≥

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