From bulk to interface dynamics, in and out of equilibrium

Fr\'ed\'eric van Wijland; Julien Tailleur; Lila Sarfati

arxiv: 2605.16503 · v1 · pith:XZT5XZMVnew · submitted 2026-05-15 · ❄️ cond-mat.stat-mech · cond-mat.soft

From bulk to interface dynamics, in and out of equilibrium

Lila Sarfati , Julien Tailleur , Fr\'ed\'eric van Wijland This is my paper

Pith reviewed 2026-05-19 21:18 UTC · model grok-4.3

classification ❄️ cond-mat.stat-mech cond-mat.soft

keywords interface dynamicsfluctuating hydrodynamicsactive matterphase separationnon-equilibrium systemsdynamical actionstochastic field theories

0 comments

The pith

A dynamical-action approach derives linear interface relaxation and fluctuations from bulk hydrodynamics for both equilibrium and non-equilibrium systems.

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

This paper develops a method to extract the dynamics of weakly deformed interfaces directly from the fluctuating hydrodynamics of the phase-separating fields. By choosing an appropriate interface definition and employing the dynamical-action formalism for path probabilities, it obtains the linear relaxation and fluctuations around the interface. The approach works for equilibrium models and extends to their active, non-equilibrium counterparts, providing a controlled alternative to common approximations. Readers interested in phase separation and pattern formation would value a unified derivation that avoids uncontrolled steps in driven systems.

Core claim

We study the dynamics of weakly deformed interfaces separating two stable phases, starting from the fluctuating hydrodynamics of the phase-separating fields. Using a well-chosen definition for the interface and the dynamical-action formalism to represent path probabilities, we derive the linear relaxation of the interface and the fluctuations around it for a large class of models. Our method applies to equilibrium dynamics, where it recovers and complements existing results, but also extends to their non-equilibrium counterparts. We explain how non-linear terms can be systematically computed and illustrate their derivations in the case of (active) model A.

What carries the argument

The dynamical-action formalism for representing path probabilities, which encodes the likelihood of field trajectories and permits projection of the bulk stochastic equations onto interface coordinates.

If this is right

The linear relaxation rate and fluctuation spectrum of the interface height follow directly from the bulk hydrodynamic parameters.
Nonlinear corrections to the interface equation can be computed order by order from successive expansions of the same action.
The derivation recovers known equilibrium interface results as a special case while remaining valid for active systems.
A common ansatz for obtaining interface equations is valid at equilibrium but produces uncontrolled errors in active field theories.

Where Pith is reading between the lines

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

The projection method could be applied to derive interface equations in other driven systems with multiple conserved quantities.
Numerical simulations of active phase separation could test the predicted linear fluctuation spectrum against the analytic expressions.
The framework might generalize to curved interfaces or to dynamics beyond the linear regime by retaining higher-order terms.

Load-bearing premise

The interface remains only weakly deformed and the two phases stay stable and distinct.

What would settle it

Simulate the full field equations for a small sinusoidal perturbation of the interface in an active phase-separating system such as active model A and check whether the measured relaxation rate matches the rate obtained from the bulk parameters via the projection.

Figures

Figures reproduced from arXiv: 2605.16503 by Fr\'ed\'eric van Wijland, Julien Tailleur, Lila Sarfati.

**Figure 2.** Figure 2: (Left) Relaxation time of a one-dimensional [PITH_FULL_IMAGE:figures/full_fig_p012_2.png] view at source ↗

**Figure 3.** Figure 3: Relaxation time of a one-dimensional inter [PITH_FULL_IMAGE:figures/full_fig_p022_3.png] view at source ↗

**Figure 4.** Figure 4: Relaxation of a one-dimensional interface in a [PITH_FULL_IMAGE:figures/full_fig_p029_4.png] view at source ↗

read the original abstract

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

This paper derives interface relaxation and fluctuations from bulk fluctuating hydrodynamics using a dynamical-action approach, extending the method to non-equilibrium models while flagging an uncontrolled ansatz.

read the letter

The main thing to know is that the authors start from bulk fluctuating hydrodynamics and project onto a weakly deformed interface using a chosen definition of the interface position together with the dynamical-action formalism. This yields the linear relaxation dynamics and the fluctuation spectrum for a broad class of models, recovering the equilibrium cases as a sanity check and then carrying the same steps over to active, non-equilibrium dynamics. They also outline how to generate the non-linear corrections systematically and work through the example of active Model A. The explicit warning that a popular ansatz is rigorously justified only in equilibrium but lacks control out of equilibrium is a practical point worth noting for anyone modeling active phase separation.

Referee Report

2 major / 2 minor

Summary. The manuscript derives the linear relaxation of weakly deformed interfaces and the fluctuations around them, starting from the fluctuating hydrodynamics of phase-separating fields. Using a specific interface definition and the dynamical-action formalism for path probabilities, the approach recovers and complements known equilibrium results while extending to non-equilibrium dynamics; it also shows how non-linear terms can be computed systematically and illustrates this for active Model A, while flagging the uncontrolled nature of a common ansatz in active field theories.

Significance. If the central derivations are rigorous, the work supplies a systematic route from bulk fluctuating hydrodynamics to interface equations that applies across equilibrium and active non-equilibrium models. The explicit treatment of non-linear corrections and the caution regarding the popular ansatz constitute clear strengths that could influence studies of phase separation in active matter.

major comments (2)

[§4] §4 (non-equilibrium projection): the derivation of linear interface relaxation relies on projecting the dynamical action onto interface coordinates under the assumption of weak deformation and stable phases; however, the manuscript does not provide explicit bounds showing that higher-order non-linear terms (illustrated for active Model A) remain negligible or controlled when the same projection is applied out of equilibrium, leaving open the possibility of uncontrolled corrections analogous to those in the criticized ansatz.
[§5.2] §5.2 (active Model A illustration): the computation of non-linear terms is presented as systematic, yet the section does not quantify the truncation error or demonstrate that the retained linear relaxation and fluctuation spectra are insensitive to the neglected contributions under the stated weak-deformation condition.

minor comments (2)

[Notation] The notation distinguishing the interface height function from the underlying bulk order-parameter field is introduced gradually; a consolidated table of symbols at the beginning of the methods section would improve readability.
[Introduction] A few references to prior interface derivations in active systems (e.g., works on active Model B) appear only in passing; expanding the discussion in the introduction would better situate the new results.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their thorough review and constructive feedback on our manuscript. We appreciate the recognition of the strengths of our approach in deriving interface dynamics from bulk fluctuating hydrodynamics. We address the major comments point by point below, and have made revisions to the manuscript to clarify the points raised.

read point-by-point responses

Referee: §4 (non-equilibrium projection): the derivation of linear interface relaxation relies on projecting the dynamical action onto interface coordinates under the assumption of weak deformation and stable phases; however, the manuscript does not provide explicit bounds showing that higher-order non-linear terms (illustrated for active Model A) remain negligible or controlled when the same projection is applied out of equilibrium, leaving open the possibility of uncontrolled corrections analogous to those in the criticized ansatz.

Authors: We agree that providing more explicit discussion on the control of higher-order terms would improve the manuscript. Our derivation uses the dynamical action formalism, where the projection is exact for the linear response under the weak deformation assumption, as the interface coordinate is treated as the collective variable. The non-linear terms arise as perturbative corrections in the amplitude of the deformation. This structure is preserved out of equilibrium because the action is defined similarly. We have revised the manuscript to include a brief discussion in §4 on why the corrections remain controlled by the small parameter (deformation amplitude), similar to standard hydrodynamic derivations, and note that full bounds would require a more mathematical treatment beyond the scope of this work but the perturbative expansion is systematic. revision: partial
Referee: §5.2 (active Model A illustration): the computation of non-linear terms is presented as systematic, yet the section does not quantify the truncation error or demonstrate that the retained linear relaxation and fluctuation spectra are insensitive to the neglected contributions under the stated weak-deformation condition.

Authors: We thank the referee for this observation. In §5.2, we illustrate the systematic computation by deriving the first non-linear correction explicitly for active Model A. The linear relaxation and fluctuation spectra are obtained from the leading terms in the expansion and are independent of the higher-order contributions at this order. To address the concern, we have added a sentence quantifying that the truncation error is of order O(δh²) where δh is the interface deformation, which is small by assumption, ensuring the leading spectra are unaffected. This demonstrates the insensitivity at the linear level. revision: yes

Circularity Check

0 steps flagged

Derivation from bulk fluctuating hydrodynamics is self-contained with no circular reductions

full rationale

The paper starts from the fluctuating hydrodynamics of phase-separating fields and uses the dynamical-action formalism to represent path probabilities, projecting onto a well-chosen interface definition to obtain linear relaxation and fluctuations. This holds for equilibrium (recovering prior results) and extends to non-equilibrium cases, with systematic inclusion of non-linear terms shown explicitly for active Model A. The central claims rest on the bulk equations plus controlled projection under stated assumptions of weak deformation and phase stability; no load-bearing step reduces by construction to a fit, self-citation, or imported ansatz, and the paper itself flags uncontrolled approximations in alternative approaches.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The central claim rests on the fluctuating hydrodynamics of phase-separating fields and the dynamical-action formalism; these are treated as established background rather than derived inside the paper.

axioms (2)

domain assumption Fluctuating hydrodynamics provides a valid description of the phase-separating fields both in and out of equilibrium.
Invoked at the start of the derivation to represent the bulk dynamics from which the interface equations are obtained.
domain assumption The dynamical-action formalism correctly encodes path probabilities for the chosen class of models.
Used to convert the stochastic bulk dynamics into an action whose saddle or expansion yields the interface relaxation and fluctuations.

pith-pipeline@v0.9.0 · 5654 in / 1135 out tokens · 72246 ms · 2026-05-19T21:18:10.331252+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/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

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

Using a well-chosen definition for the interface and the dynamical-action formalism to represent path probabilities, we derive the linear relaxation of the interface and the fluctuations around it
IndisputableMonolith/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

?

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

We highlight the danger of a popular ansatz used to derive interface dynamics, which was rigorously established in equilibrium but is uncontrolled for active field theories

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

126 extracted references · 126 canonical work pages · 5 internal anchors

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(1) with a nonequilibrium drivew[ϕ] = −λ(∇ϕ)2, leading to: ∂tϕ=− δF δϕ −λ(∇ϕ) 2 + √ 2T η(r, z, t),(146) whereF[ϕ] remains given by Eq

Deriving the Edwards-Wilkinson equation The dynamics of active model A (AMA) is de- fined by Eq. (1) with a nonequilibrium drivew[ϕ] = −λ(∇ϕ)2, leading to: ∂tϕ=− δF δϕ −λ(∇ϕ) 2 + √ 2T η(r, z, t),(146) whereF[ϕ] remains given by Eq. (2). Note that we keep the notationTfor the amplitude of the noise, even thoughTis not, thermodynamically speaking, a tempera...

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(149), withu 0 =ℓ 0

Deriving a KPZ equation The full action for active model A is given in Eq. (149), withu 0 =ℓ 0. We shall now follow the same steps as for passive model A and implement a perturbation expansion in powers of √ T. To pro- ceed, we change variables from ¯hto ¯h′ to eliminate time derivatives from the non-Gaussian part of the action: ¯h= ¯h′ + ¯χ⊥, ∂zχ⊥ 1 +⟨∂ ...

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Motivations for introducing active model B+ Let us now turn to the simplest nonequilibrium generalization of model B. In active matter, the motility-induced phase separation [100–106] under- gone by pairwise repulsive self-propelled particles, presents features strikingly similar to equilibrium phase separation, in spite of being an intrinsically nonequil...

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(170) The lack of steady-state current enforces the stronger constraint jc =−∂ z −∂2 z mc +f ′(mc) + 2λ−ζ 2 (∂zmc)2 = 0

Dynamical action for interface dynamics The mean-field steady-state profile of the active model B+ satisfies ∂2 z −∂2 z mc +f ′(mc) + 2λ−ζ 2 (∂zmc)2 = 0. (170) The lack of steady-state current enforces the stronger constraint jc =−∂ z −∂2 z mc +f ′(mc) + 2λ−ζ 2 (∂zmc)2 = 0. (171) The corresponding dynamical action truncated to quadratic order reads S0 = 1...

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This breaking of time-reversal symmetry is expected to generate a KPZ nonlin- earity

KPZ nonlinearity in model A and symmetry of the potential In section V A 3, we have shown that, in the pres- ence of an asymmetric potential with degenerate minima, thermal fluctuations generate a nonvanish- ing drift velocity. This breaking of time-reversal symmetry is expected to generate a KPZ nonlin- earity. Let us motivate this by looking at one of t...

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Curvature correction in model A Diehl, Kroll and Wagner [66] have shown at the level of the statics that the interfacial free energy for the Ginzburg-Landauϕ 4 field theory (the free energy of Eq. (2) with the potential of Eq. (38)) is given, in the limit of low temperature, by F[h] =σ Z r p 1 + (∇rh)2 .(B4) It has been argued [29] that the proper dynami-...

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The only possible combination is − 2 T 2 Z r,t Z r′,t′ (∇rh)2(r, t)¯h(r′, t′)∇rh(r′, t′)· Z z,z ′ ∂2 z mc(z) ∂zmc(z′) σ × ¯χ⊥(r, z, t)∇r∂zχ⊥(r′, z′, t′) ′ c,0

Let us turn to the second cumulant: such a contribution would involve two bulk fluctuation fields. The only possible combination is − 2 T 2 Z r,t Z r′,t′ (∇rh)2(r, t)¯h(r′, t′)∇rh(r′, t′)· Z z,z ′ ∂2 z mc(z) ∂zmc(z′) σ × ¯χ⊥(r, z, t)∇r∂zχ⊥(r′, z′, t′) ′ c,0 . (B9) This corresponds to the Feynman diagram h h ¯h h where in the notations of Sec. VI A 2, non-...

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Detailed derivation of the first order Let us start from Eq. (92). Because the first eigen- value of Ω 0 is zero, the first term dominates in the long wavelength limitq→0. However, to control this expansion, we need to account for the depen- dence of L−1 q onq, and properly estimate the orders inqof the remaining terms. To make the argu- ment fully explic...

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It is immediately visible that these eigenfunctions do not vanish at infinity and therefore do not have a well-defined integral for a strictly infinite system. We find it useful to work in a system of finite size 2L. Then, taking theL→ ∞limit whenever possible (in tanh terms), the normalization reads N2 k = 4L(2k2 + 1)(k2 + 2)−12 r 2 τ (k2 + 1).(C4) With ...

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J. Romano, R. Golestanian, and B. Mahault, Dy- namics of phase-separated interfaces in inhomoge- neous and driven mixtures, Soft Matter21, 9245 (2025)

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L. Langford and A. K. Omar, Phase separation, capillarity, and odd-surface flows in chiral ac- tive matter, Physical Review Letters134, 068301 (2025)

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S. Burekovi´ c, F. De Luca, M. E. Cates, and C. Nardini, Active cahn–hilliard theory for non- equilibrium phase separation: quantitative macro- scopic predictions and a microscopic derivation, arXiv preprint arXiv:2601.16539 (2026)

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J. O’Byrne, Nonequilibrium currents in stochastic field theories: A geometric insight, Physical Re- view E107, 054105 (2023)

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Langford and A

L. Langford and A. K. Omar, The mechanics of nucleation and growth and the surface tensions of active matter, The Journal of Chemical Physics 163(2025)

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See sections 2.3 and 2.4 of [1] for models A and B, respectively

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Ohta, Private notes for L

T. Ohta, Private notes for L. Sarfati (2025)

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Showing first 80 references.

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(1) with a nonequilibrium drivew[ϕ] = −λ(∇ϕ)2, leading to: ∂tϕ=− δF δϕ −λ(∇ϕ) 2 + √ 2T η(r, z, t),(146) whereF[ϕ] remains given by Eq

Deriving the Edwards-Wilkinson equation The dynamics of active model A (AMA) is de- fined by Eq. (1) with a nonequilibrium drivew[ϕ] = −λ(∇ϕ)2, leading to: ∂tϕ=− δF δϕ −λ(∇ϕ) 2 + √ 2T η(r, z, t),(146) whereF[ϕ] remains given by Eq. (2). Note that we keep the notationTfor the amplitude of the noise, even thoughTis not, thermodynamically speaking, a tempera...

work page

[2] [2]

(149), withu 0 =ℓ 0

Deriving a KPZ equation The full action for active model A is given in Eq. (149), withu 0 =ℓ 0. We shall now follow the same steps as for passive model A and implement a perturbation expansion in powers of √ T. To pro- ceed, we change variables from ¯hto ¯h′ to eliminate time derivatives from the non-Gaussian part of the action: ¯h= ¯h′ + ¯χ⊥, ∂zχ⊥ 1 +⟨∂ ...

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Motivations for introducing active model B+ Let us now turn to the simplest nonequilibrium generalization of model B. In active matter, the motility-induced phase separation [100–106] under- gone by pairwise repulsive self-propelled particles, presents features strikingly similar to equilibrium phase separation, in spite of being an intrinsically nonequil...

work page

[4] [4]

(170) The lack of steady-state current enforces the stronger constraint jc =−∂ z −∂2 z mc +f ′(mc) + 2λ−ζ 2 (∂zmc)2 = 0

Dynamical action for interface dynamics The mean-field steady-state profile of the active model B+ satisfies ∂2 z −∂2 z mc +f ′(mc) + 2λ−ζ 2 (∂zmc)2 = 0. (170) The lack of steady-state current enforces the stronger constraint jc =−∂ z −∂2 z mc +f ′(mc) + 2λ−ζ 2 (∂zmc)2 = 0. (171) The corresponding dynamical action truncated to quadratic order reads S0 = 1...

work page

[5] [5]

This breaking of time-reversal symmetry is expected to generate a KPZ nonlin- earity

KPZ nonlinearity in model A and symmetry of the potential In section V A 3, we have shown that, in the pres- ence of an asymmetric potential with degenerate minima, thermal fluctuations generate a nonvanish- ing drift velocity. This breaking of time-reversal symmetry is expected to generate a KPZ nonlin- earity. Let us motivate this by looking at one of t...

work page

[6] [6]

(2) with the potential of Eq

Curvature correction in model A Diehl, Kroll and Wagner [66] have shown at the level of the statics that the interfacial free energy for the Ginzburg-Landauϕ 4 field theory (the free energy of Eq. (2) with the potential of Eq. (38)) is given, in the limit of low temperature, by F[h] =σ Z r p 1 + (∇rh)2 .(B4) It has been argued [29] that the proper dynami-...

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The only possible combination is − 2 T 2 Z r,t Z r′,t′ (∇rh)2(r, t)¯h(r′, t′)∇rh(r′, t′)· Z z,z ′ ∂2 z mc(z) ∂zmc(z′) σ × ¯χ⊥(r, z, t)∇r∂zχ⊥(r′, z′, t′) ′ c,0

Let us turn to the second cumulant: such a contribution would involve two bulk fluctuation fields. The only possible combination is − 2 T 2 Z r,t Z r′,t′ (∇rh)2(r, t)¯h(r′, t′)∇rh(r′, t′)· Z z,z ′ ∂2 z mc(z) ∂zmc(z′) σ × ¯χ⊥(r, z, t)∇r∂zχ⊥(r′, z′, t′) ′ c,0 . (B9) This corresponds to the Feynman diagram h h ¯h h where in the notations of Sec. VI A 2, non-...

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Detailed derivation of the first order Let us start from Eq. (92). Because the first eigen- value of Ω 0 is zero, the first term dominates in the long wavelength limitq→0. However, to control this expansion, we need to account for the depen- dence of L−1 q onq, and properly estimate the orders inqof the remaining terms. To make the argu- ment fully explic...

work page

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We find it useful to work in a system of finite size 2L

It is immediately visible that these eigenfunctions do not vanish at infinity and therefore do not have a well-defined integral for a strictly infinite system. We find it useful to work in a system of finite size 2L. Then, taking theL→ ∞limit whenever possible (in tanh terms), the normalization reads N2 k = 4L(2k2 + 1)(k2 + 2)−12 r 2 τ (k2 + 1).(C4) With ...

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All relevant scalar products have been estimated asL→ ∞: 2q e01,L −1 q e01 =O(1) (C13) 2q ˜ek,L −1 q e01 =O 1√ L 1 |k| (C14) 2q ˜ek,L −1 q ˜el =O 1 L 1 |kl| (C15) 2q ˜e0,L −1 q e01 =O( √ L) (C16) 2q ˜e0,L −1 q ˜ek =O(1) 1 |k| (C17) 2q ˜e0,L −1 q ˜e0 =O(L) (C18) wheree 01 stands for eithere 0 ore 1,kandlare both nonzero, and the scalings ink, lindicated on...

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We can however provide the reader with some intuition on the behavior of the dispersion relation to the next order

Intuition for next order correction With the expansion above, we obtain the leading order inqof the dispersion relation: iω= 2σq3 A(0) (C23) For higher orders inq, the eigenvectors other than ∂zmc start playing a role. We can however provide the reader with some intuition on the behavior of the dispersion relation to the next order. We be- gin by identify...

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