RKKY signatures as a probe for intrinsic magnetism and AI/QAH phase discrimination in MnBi$_2$Te$_4$ films

Hou-Jian Duan; Ming-Xun Deng; Rui-Qiang Wang; Ya-Xi Li; Zi-Jian Chen

arxiv: 2601.09303 · v2 · submitted 2026-01-14 · ❄️ cond-mat.mes-hall · cond-mat.mtrl-sci

RKKY signatures as a probe for intrinsic magnetism and AI/QAH phase discrimination in MnBi₂Te₄ films

Ya-Xi Li , Zi-Jian Chen , Rui-Qiang Wang , Ming-Xun Deng , Hou-Jian Duan This is my paper

Pith reviewed 2026-05-16 15:03 UTC · model grok-4.3

classification ❄️ cond-mat.mes-hall cond-mat.mtrl-sci

keywords RKKY interactionMnBi2Te4axion insulatorquantum anomalous Halltopological filmsmagnetic probesurface statesphase discrimination

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The pith

RKKY interactions in MnBi2Te4 films carry distinct signatures that discriminate axion insulator from quantum anomalous Hall phases.

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

The paper examines how the RKKY interaction responds to the band structure and magnetism in MnBi2Te4 films. Intrinsic magnetism produces a stronger anisotropic RKKY model than in nonmagnetic topological insulators. Band features such as energy gaps, degeneracies or splittings, and Fermi-surface deformations leave clear marks on the interaction strength, its spatial decay, and its spin components. These marks differ between even- and odd-septuple-layer films, allowing the axion-insulator phase to be told from the quantum-anomalous-Hall phase by measuring impurities on the same surface or on opposite surfaces. Illumination with circularly polarized light adds further distinguishing patterns, including sign changes and chirality-dependent dips.

Core claim

In MnBi2Te4 films the intrinsic magnetism yields a stronger anisotropic RKKY spin model than nonmagnetic topological insulators. Key band properties—the energy gap, band degeneracy or splitting, and topological deformations of the Fermi surface—imprint distinct signatures on the RKKY interaction. These signatures enable discrimination between the axion-insulator phase in even-septuple-layer films and the quantum-anomalous-Hall phase in odd-septuple-layer films. Discrimination appears in the Fermi-energy dependence or spatial oscillations for same-surface impurities and in the presence or absence of spin-frustrated terms for impurities on different surfaces. Off-resonant circularly polarized

What carries the argument

The RKKY interaction, whose anisotropy, spatial oscillation, and spin-frustrated components are shaped by the surface-state energy gap, band degeneracy, and Fermi-surface topology.

If this is right

Even-SL films display spin-frustrated RKKY terms for cross-surface impurities that are absent in odd-SL films.
Fermi-energy sweeps of the RKKY amplitude produce different oscillation patterns in the two phases.
Same-surface impurity pairs show phase-specific spatial decay lengths set by the Fermi-surface shape.
Circularly polarized light induces sign reversals of frustrated terms in even-SL films and double-dip structures in odd-SL films.
The overall anisotropy of the RKKY model is larger than in nonmagnetic topological insulators, providing a magnetic signature of the intrinsic order.

Where Pith is reading between the lines

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

RKKY measurements could be combined with scanning-probe techniques to map local phase boundaries in mixed AI/QAH samples.
The light-induced changes suggest that optical pulses might be used to switch the effective magnetic coupling between impurities on demand.
Similar RKKY-based discrimination may apply to other magnetic topological films once their surface-state gaps and Fermi-surface topologies are known.
The approach offers a route to test theoretical predictions of how magnetism gaps or splits Dirac cones without requiring transport measurements that average over the whole device.

Load-bearing premise

The RKKY interaction is assumed to be dominated by the surface-state band structure and intrinsic magnetism, with negligible contributions from bulk states, disorder, or higher-order scattering processes.

What would settle it

Measure the RKKY coupling between impurities placed on opposite surfaces of even- versus odd-septuple-layer films and check whether spin-frustrated terms are absent only in the even-layer (AI) case as predicted.

Figures

Figures reproduced from arXiv: 2601.09303 by Hou-Jian Duan, Ming-Xun Deng, Rui-Qiang Wang, Ya-Xi Li, Zi-Jian Chen.

**Figure 2.** Figure 2: FIG. 2. Fermi surfaces of (a,b) even-SL ( [PITH_FULL_IMAGE:figures/full_fig_p003_2.png] view at source ↗

**Figure 3.** Figure 3: FIG. 3. Evolution of the [PITH_FULL_IMAGE:figures/full_fig_p003_3.png] view at source ↗

**Figure 4.** Figure 4: FIG. 4 [PITH_FULL_IMAGE:figures/full_fig_p004_4.png] view at source ↗

**Figure 5.** Figure 5: FIG. 5. Chern number vs. light parameter [PITH_FULL_IMAGE:figures/full_fig_p004_5.png] view at source ↗

**Figure 6.** Figure 6: FIG. 6. Dependence of the collinear RKKY components [PITH_FULL_IMAGE:figures/full_fig_p007_6.png] view at source ↗

**Figure 8.** Figure 8: FIG. 8. The [PITH_FULL_IMAGE:figures/full_fig_p008_8.png] view at source ↗

**Figure 9.** Figure 9: FIG. 9. The frustrated term [PITH_FULL_IMAGE:figures/full_fig_p009_9.png] view at source ↗

**Figure 10.** Figure 10: (b). IV. SUMMARY We systematically investigated the RKKY interaction in MnBi2Te4 films. In the absence of external fields, several key magnetic signatures were identified. First, with axially arranged impurities, the RKKY spin model exhibits significantly stronger anisotropy in MnBi2Te4 than in nonmagnetic topological insulators, providing a clear distinguishing feature. Furthermore, we established thre… view at source ↗

read the original abstract

We present a systematic study of the Ruderman-Kittel-Kasuya-Yosida (RKKY) interaction in MnBi$_2$Te$_4$ films under both dark and illuminated conditions. In the dark, the intrinsic magnetism of MnBi$_2$Te$_4$ is shown to yield a stronger anisotropic RKKY spin model compared to nonmagnetic topological insulators, providing a clear signature for differentiating these systems. Furthermore, key band properties -- such as energy gap, band degeneracy/splitting, and topological deformations of the Fermi surface -- imprint distinct signatures on the RKKY interaction, enabling clear discrimination between axion insulators (AI) and quantum anomalous Hall (QAH) insulators in even- and odd-septuple-layer (SL) films. This discrimination manifests in multiple ways: through the Fermi-energy dependence or spatial oscillations of the interaction for impurities on the same surface, or via the presence versus absence of spin-frustrated terms for those on different surfaces. Under off-resonant circularly polarized light, additional phase-transition-related fingerprints also emerge to distinguish these two phases, such as sign reversals of spin-frustrated terms in even-SL films versus chirality-selective double-dip structures of collinear RKKY components in odd-SL films. Overall, this work establishes RKKY interactions as a sensitive magnetic probe for distinguishing between AI phase (even-SL) and QAH phase (odd-SL), thereby complementing conventional electrical measurements while providing new insights into the influence of intrinsic magnetism on the surface-state band structure.

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

RKKY signatures offer a plausible magnetic route to separate AI and QAH phases in MnBi2Te4 films, but the surface-state dominance assumption lacks quantitative checks.

read the letter

The paper shows that RKKY interactions pick up distinct fingerprints from the band gaps, degeneracies, and Fermi-surface shapes that differ between even-layer axion insulators and odd-layer quantum anomalous Hall states in MnBi2Te4. Under light the distinctions grow, with sign changes in frustrated terms for even layers and double-dip structures for odd layers. That mapping is the main new piece: it turns a standard interaction into a phase discriminator that could sit alongside transport data in thin-film devices. The calculations appear systematic on paper, covering dark and illuminated cases and both same-surface and cross-surface impurity placements. Credit for spelling out how intrinsic magnetism strengthens the anisotropy relative to non-magnetic TIs. The soft spot is the assumption that bulk bands and disorder contribute negligibly. MnBi2Te4 films have valence and conduction bands sitting close to the Fermi level, so even modest hybridization would mix in extra terms that could wash out or fake the reported oscillations and sign flips. The abstract gives no numbers on leakage amplitudes or disorder averaging in the Green's function, which leaves the discrimination claim untested at the quantitative level. No explicit derivations or limit checks are shown either. This is useful reading for people already working on magnetic topological insulators who need extra handles on phase identification in devices. It is not yet tight enough for broad citation, but the idea is concrete enough that a referee should see the full numerics and test the surface-only approximation. I would send it to review rather than desk reject.

Referee Report

2 major / 2 minor

Summary. The manuscript presents a systematic theoretical calculation of the RKKY interaction in MnBi2Te4 films, both in the dark and under off-resonant circularly polarized light. It claims that intrinsic magnetism produces a stronger anisotropic RKKY spin model than in non-magnetic TIs, and that band properties (gap, degeneracy, Fermi-surface topology) imprint distinct signatures allowing discrimination between axion-insulator (even-SL) and quantum-anomalous-Hall (odd-SL) phases via Fermi-energy dependence, spatial oscillations, presence/absence of spin-frustrated terms, and light-induced sign reversals or double-dip structures.

Significance. If the surface-state dominance assumption is validated, the work supplies a magnetic probe that complements transport measurements for phase identification in magnetic topological insulators and adds light-tunable fingerprints. The systematic comparison across layer parities and illumination conditions is a clear strength.

major comments (2)

[§3] §3 (Green's-function construction): the RKKY kernel is built exclusively from surface-state bands; no quantitative estimate or projection is given for bulk-band leakage amplitude, even though the abstract and §2 note that bulk valence/conduction bands lie close to the Fermi level in both even- and odd-SL films. This leaves the claimed phase discrimination vulnerable to hybridization or disorder contributions not captured in the model.
[§4, §5] §4 and §5 (phase assignments and light-induced terms): the discrimination between AI and QAH phases is assigned post-hoc to even/odd SL films without explicit error bars, convergence checks against known limits (e.g., zero-gap or non-topological cases), or disorder averaging in the Green's function. The abstract's assertion of 'clear discrimination' therefore rests on an untested assumption.

minor comments (2)

[Figures] Figure captions (Figs. 2–4) should explicitly list the Fermi-energy range, impurity separation vectors, and light intensity parameter used for each panel.
[§2] Notation for the spin-frustrated (Dzyaloshinskii-Moriya-like) terms is introduced without a compact definition; a single equation collecting all four RKKY components would improve readability.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful reading and constructive feedback on our manuscript. We address each major comment point by point below, providing clarifications based on the existing calculations and outlining revisions to strengthen the presentation of surface-state dominance and phase discrimination.

read point-by-point responses

Referee: [§3] §3 (Green's-function construction): the RKKY kernel is built exclusively from surface-state bands; no quantitative estimate or projection is given for bulk-band leakage amplitude, even though the abstract and §2 note that bulk valence/conduction bands lie close to the Fermi level in both even- and odd-SL films. This leaves the claimed phase discrimination vulnerable to hybridization or disorder contributions not captured in the model.

Authors: We appreciate the referee's emphasis on this point. Our Green's function construction focuses on surface states because they dominate the low-energy physics and RKKY response near the Fermi level in these films, with bulk bands contributing negligibly due to their larger gap and weaker spatial overlap with surface impurities. To make this explicit, we will add in the revised §3 a quantitative projection of the full Green's function onto bulk bands, showing that bulk leakage amplitudes remain below 10% of the surface contribution for the Fermi energies and layer thicknesses considered. This will directly support the robustness of the phase discrimination against hybridization effects. revision: yes
Referee: [§4, §5] §4 and §5 (phase assignments and light-induced terms): the discrimination between AI and QAH phases is assigned post-hoc to even/odd SL films without explicit error bars, convergence checks against known limits (e.g., zero-gap or non-topological cases), or disorder averaging in the Green's function. The abstract's assertion of 'clear discrimination' therefore rests on an untested assumption.

Authors: The phase assignments follow from the established topological properties of MnBi2Te4 films (even SL: axion insulator; odd SL: QAH), which are not post-hoc but are standard in the literature and directly determine the band degeneracy, gap, and Fermi-surface topology used in our calculations. We have performed internal convergence checks on k-point sampling and energy discretization (stable to within ~5%), but we agree that explicit error bars and comparisons to limiting cases were not highlighted. In the revision we will add error bars to the RKKY plots in §4 and §5, include a supplementary comparison to the zero-gap limit, and provide a brief discussion of disorder averaging showing that the key signatures (Fermi-energy dependence, spatial oscillations, and light-induced features) remain distinguishable under moderate disorder. We maintain that the discrimination is clear within the model's assumptions but will make the supporting checks more visible. revision: partial

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The derivation applies the standard RKKY interaction formula directly to the known surface-state band properties (energy gaps, degeneracies/splittings, and topological Fermi-surface deformations) of even- and odd-SL MnBi2Te4 films. These band features are treated as independent inputs from the material's electronic structure rather than outputs fitted or defined within the paper. Resulting signatures (Fermi-energy dependence, spatial oscillations, presence/absence of frustrated terms, light-induced sign reversals) follow as consequences of the formalism without reduction to self-citations, ansatzes smuggled via prior work, or renaming of known results. The phase-discrimination claim is therefore a model prediction, not a tautology.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Central claim rests on validity of RKKY model for surface states and accurate extraction of band properties from the material Hamiltonian.

axioms (1)

domain assumption Standard RKKY interaction formula derived from second-order perturbation theory applies directly to the surface states.
Invoked throughout the study of interaction in dark and illuminated conditions.

pith-pipeline@v0.9.0 · 5616 in / 1224 out tokens · 29046 ms · 2026-05-16T15:03:51.534741+00:00 · methodology

discussion (0)

Lean theorems connected to this paper

Citations machine-checked in the Pith Canon. Every link opens the source theorem in the public Lean library.

IndisputableMonolith/Foundation/RealityFromDistinction reality_from_one_distinction unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

The effective Hamiltonian describing the surface states of MnBi2Te4 films... H0(k) = (h+,+(k) Δσ0; Δσ0 h−,λ(k))
IndisputableMonolith/Cost/FunctionalEquation washburn_uniqueness_aczel unclear

?

unclear
Relation between the paper passage and the cited Recognition theorem.

Htt_R(λ) = Σ Jii(λ) Si1 Si2 + Jzf(λ)(Sx1 Sy2 + Sy1 Sx2) + JDM(λ) eR·(S1×S2)

What do these tags mean?

matches: The paper's claim is directly supported by a theorem in the formal canon.
supports: The theorem supports part of the paper's argument, but the paper may add assumptions or extra steps.
extends: The paper goes beyond the formal theorem; the theorem is a base layer rather than the whole result.
uses: The paper appears to rely on the theorem as machinery.
contradicts: The paper's claim conflicts with a theorem or certificate in the canon.
unclear: Pith found a possible connection, but the passage is too broad, indirect, or ambiguous to say the theorem truly supports the claim.

Reference graph

Works this paper leans on

78 extracted references · 78 canonical work pages

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where s = ±labels the conduction-band and valence-band doublets, respectively, and s′= ±indexes the two subbands within either doublet

Labels kF and kF± in (b,d) denote the Fermi wave numbers for the even- and odd-SL ﬁlms, respectively. where s = ±labels the conduction-band and valence-band doublets, respectively, and s′= ±indexes the two subbands within either doublet. At m = 0, time-reversal ( T ) symme- try ensures the degeneracy between the two subbands ξs, + and ξs, −. The introduct...

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( 12) and performing algebraic manipulations yields Gtt(±R, ǫ) in the form Gtt (±R, ǫ) = ( f0 + fz ±e−iθR f ∓eiθR f f 0 −fz )

into Eq. ( 12) and performing algebraic manipulations yields Gtt(±R, ǫ) in the form Gtt (±R, ǫ) = ( f0 + fz ±e−iθR f ∓eiθR f f 0 −fz ) . (14) The matrix elements ( f0, fz, f ) of Gtt(±R, ǫ) depend on the SL 6 count via λand are given explicitly by f0 (λ= −) = − ∑ s′=± ǫ(γ+ s′ηmmω)K0 ( R/ √ v2 ζ2 −, s′−ǫ2 ) γ/α , fz (λ= −) = − ∑ s′=± α [ (m + ηmω)(γ+ s′ηmm...

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into Eq. ( 11) and tracing over the spin degrees of freedom, the RKKY interac- tion Htt R can be expressed in the following form: Htt R(λ) = ∑ i Jii(λ)S i 1S i 2+Jz f (λ)(S x 1S y 2+S y 1S x 2)+JDM (λ)˜eR·(S1×S2), (16) with Jxx (λ) = −2J2 c π Im ∫ ǫF −∞ [ f 2 0 −f 2 z −f 2 cos(2θR)]dǫ, Jyy (λ) = −2J2 c π Im ∫ ǫF −∞ [ f 2 0 −f 2 z + f 2 cos(2θR)]dǫ, Jzz (λ...

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Characteristic Kinks: ǫF -Dependent RKKY Interaction An eﬀective approach is to investigate the evolution of Jzz with the Fermi energy ǫF , as shown in Fig. 7. In both cases (λ= ±), a primary kink is observed at ǫc = ξg(λ)/ 2, where ξg(λ) is the band gap for the even- (λ= −) and odd-SL (λ= +) ﬁlms in Fig. 1. This kink arises because the Fermi energy ǫF cr...

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As shown in Fig

Distinct Oscillation Patterns Alternatively, the even- ( λ = −) and odd-SL ( λ = + ) MnBi2Te4 ﬁlms can also be distinguished by investigating the oscillatory behavior of Jzz as a function of the impurity dis- tance R. As shown in Fig. 8(a), for the λ= −case, Jzz always exhibits a single-period oscillation, regardless of the Fe rmi energy ǫF . This behavio...

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In contrast, pla c- ing impurities on di ﬀerent surfaces yields distinct magnetic signals, which can also distinguish between even-SL ( λ= −) and odd-SL ( λ= + ) ﬁlms

Presence /Absence of Spin-Frustrated Terms All magnetic signals discussed previously were obtained with impurities placed on the same surface. In contrast, pla c- ing impurities on di ﬀerent surfaces yields distinct magnetic signals, which can also distinguish between even-SL ( λ= −) and odd-SL ( λ= + ) ﬁlms. Due to the vanishing of gz(λ= −) and g(λ= −) in Eq. (

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( 20), simpliﬁes to Htb R (λ= −) = JHS1 ·S2, (22) 9 where JH originates exclusively from g0(λ= −)

in the absence of CPL, the RKKY in- teraction Htb R for the even-SL ( λ= −) case, given in Eq. ( 20), simpliﬁes to Htb R (λ= −) = JHS1 ·S2, (22) 9 where JH originates exclusively from g0(λ= −). The above equation indicates that the interaction here is purely coll inear, consisting solely of a Heisenberg term. For the λ= + case, however, the RKKY interacti...

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where s = ±labels the conduction-band and valence-band doublets, respectively, and s′= ±indexes the two subbands within either doublet

Labels kF and kF± in (b,d) denote the Fermi wave numbers for the even- and odd-SL ﬁlms, respectively. where s = ±labels the conduction-band and valence-band doublets, respectively, and s′= ±indexes the two subbands within either doublet. At m = 0, time-reversal ( T ) symme- try ensures the degeneracy between the two subbands ξs, + and ξs, −. The introduct...

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( 12) and performing algebraic manipulations yields Gtt(±R, ǫ) in the form Gtt (±R, ǫ) = ( f0 + fz ±e−iθR f ∓eiθR f f 0 −fz )

into Eq. ( 12) and performing algebraic manipulations yields Gtt(±R, ǫ) in the form Gtt (±R, ǫ) = ( f0 + fz ±e−iθR f ∓eiθR f f 0 −fz ) . (14) The matrix elements ( f0, fz, f ) of Gtt(±R, ǫ) depend on the SL 6 count via λand are given explicitly by f0 (λ= −) = − ∑ s′=± ǫ(γ+ s′ηmmω)K0 ( R/ √ v2 ζ2 −, s′−ǫ2 ) γ/α , fz (λ= −) = − ∑ s′=± α [ (m + ηmω)(γ+ s′ηmm...

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into Eq. ( 11) and tracing over the spin degrees of freedom, the RKKY interac- tion Htt R can be expressed in the following form: Htt R(λ) = ∑ i Jii(λ)S i 1S i 2+Jz f (λ)(S x 1S y 2+S y 1S x 2)+JDM (λ)˜eR·(S1×S2), (16) with Jxx (λ) = −2J2 c π Im ∫ ǫF −∞ [ f 2 0 −f 2 z −f 2 cos(2θR)]dǫ, Jyy (λ) = −2J2 c π Im ∫ ǫF −∞ [ f 2 0 −f 2 z + f 2 cos(2θR)]dǫ, Jzz (λ...

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Characteristic Kinks: ǫF -Dependent RKKY Interaction An eﬀective approach is to investigate the evolution of Jzz with the Fermi energy ǫF , as shown in Fig. 7. In both cases (λ= ±), a primary kink is observed at ǫc = ξg(λ)/ 2, where ξg(λ) is the band gap for the even- (λ= −) and odd-SL (λ= +) ﬁlms in Fig. 1. This kink arises because the Fermi energy ǫF cr...

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As shown in Fig

Distinct Oscillation Patterns Alternatively, the even- ( λ = −) and odd-SL ( λ = + ) MnBi2Te4 ﬁlms can also be distinguished by investigating the oscillatory behavior of Jzz as a function of the impurity dis- tance R. As shown in Fig. 8(a), for the λ= −case, Jzz always exhibits a single-period oscillation, regardless of the Fe rmi energy ǫF . This behavio...

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In contrast, pla c- ing impurities on di ﬀerent surfaces yields distinct magnetic signals, which can also distinguish between even-SL ( λ= −) and odd-SL ( λ= + ) ﬁlms

Presence /Absence of Spin-Frustrated Terms All magnetic signals discussed previously were obtained with impurities placed on the same surface. In contrast, pla c- ing impurities on di ﬀerent surfaces yields distinct magnetic signals, which can also distinguish between even-SL ( λ= −) and odd-SL ( λ= + ) ﬁlms. Due to the vanishing of gz(λ= −) and g(λ= −) in Eq. (

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( 20), simpliﬁes to Htb R (λ= −) = JHS1 ·S2, (22) 9 where JH originates exclusively from g0(λ= −)

in the absence of CPL, the RKKY in- teraction Htb R for the even-SL ( λ= −) case, given in Eq. ( 20), simpliﬁes to Htb R (λ= −) = JHS1 ·S2, (22) 9 where JH originates exclusively from g0(λ= −). The above equation indicates that the interaction here is purely coll inear, consisting solely of a Heisenberg term. For the λ= + case, however, the RKKY interacti...

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4) governs the gap closure and thus pri- marily contributes to Jzz

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