Physical scaling laws in dislocation microstructures and avalanches from dislocation dynamics simulations

Charlie Kahloun; Missipsa Aissaoui; Oguz Umut Salman; Sylvain Queyreau

arxiv: 2412.21115 · v3 · submitted 2024-12-30 · ❄️ cond-mat.mtrl-sci

Physical scaling laws in dislocation microstructures and avalanches from dislocation dynamics simulations

Missipsa Aissaoui , Charlie Kahloun , Oguz Umut Salman , Sylvain Queyreau This is my paper

Pith reviewed 2026-05-23 06:26 UTC · model grok-4.3

classification ❄️ cond-mat.mtrl-sci

keywords dislocation dynamicsplastic avalanchespower law statisticsFCC copperscaling lawsavalanche exponentsslip system activity

0 comments

The pith

Three-dimensional dislocation dynamics simulations show the power-law exponent for plastic avalanches in FCC copper remains fixed at approximately 1.6 regardless of dislocation density or loading direction.

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

The paper carries out extensive 3D dislocation dynamics simulations of FCC copper across three orders of magnitude in dislocation density at constant strain rates. It establishes that avalanche sizes follow a power law with a fixed exponent of 1.6 plus or minus 0.1, independent of density and loading direction. This invariance addresses wide scatter in earlier reported exponents ranging from 1 to 2.2. Because the distributions are non-Gaussian, their averages are not well-defined, which undermines any larger-scale model that relies on average plastic kinetics. The work additionally identifies how density controls the cutoff size of the largest avalanches and the stresses that trigger them, along with correlations among active slip systems.

Core claim

Our results demonstrate that the power law exponent (α ≈ 1.6 ± 0.1) is invariant to both dislocation density and loading direction, resolving previous inconsistencies. However, dislocation density strongly controls the power law truncation scaling (Δγ_max ∝ b/√ρ) and the distribution of avalanche triggering stresses. We quantify correlations between slip system activities and show how individual system contributions evolve with avalanche size.

What carries the argument

Three-dimensional dislocation dynamics simulations tracking avalanche size distributions and slip-system activity over three orders of magnitude in dislocation density (5×10^10 to 2×10^12 m^{-2}) in FCC copper.

If this is right

A single fixed exponent can be used to describe avalanche statistics across different dislocation densities and loading conditions.
The cutoff avalanche size scales as b/√ρ, supplying an explicit density-dependent truncation for use in larger models.
The distribution of avalanche-triggering stresses depends on dislocation density and can be incorporated into mesoscale plasticity descriptions.
Correlations among slip-system activities that change with avalanche size provide quantitative input for models that track multi-slip activity.

Where Pith is reading between the lines

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

Reported experimental differences in exponents may arise mainly from variations in the dislocation densities at which the measurements were performed.
The fixed exponent and density-dependent cutoffs together allow construction of mesoscale models that avoid reliance on ill-defined averages.
Extending the same simulation protocol to higher densities or different crystal structures would test whether the 1.6 exponent remains universal.

Load-bearing premise

The chosen three-dimensional dislocation dynamics model, system sizes, boundary conditions, and strain rates produce avalanche statistics that match physical behavior in real FCC copper without dominant numerical artifacts.

What would settle it

An experimental or simulation measurement of avalanche-size distributions in FCC copper at multiple dislocation densities that yields an exponent clearly outside the 1.5–1.7 range would falsify the invariance claim.

Figures

Figures reproduced from arXiv: 2412.21115 by Charlie Kahloun, Missipsa Aissaoui, Oguz Umut Salman, Sylvain Queyreau.

**Figure 1.** Figure 1: Typical mesoscopic plastic behavior simulated by DDD for Cu [001] single crystals under constant [PITH_FULL_IMAGE:figures/full_fig_p004_1.png] view at source ↗

**Figure 2.** Figure 2: Impact of the dislocation density upon the strain resolved avalanche statistics during [001] defor [PITH_FULL_IMAGE:figures/full_fig_p005_2.png] view at source ↗

**Figure 3.** Figure 3: Impact of the loading conditions on the avalanche statistics. (a) Probability density function [PITH_FULL_IMAGE:figures/full_fig_p006_3.png] view at source ↗

**Figure 4.** Figure 4: Histograms of avalanche contributions csa for the heigh active slip systems in a [001] simulation at ρ0 = 1012 m−2 . Histograms are further separated into three bins depending upon the size of the avalanches shown on the top left: (a) small plastic bursts, (b) intermediate avalanches well in the power law regime and (c) largest avalanches. From the observation of simulation sequences, we know that dislocat… view at source ↗

**Figure 5.** Figure 5: Correlations among slip system contributions to avalanches. Correlation (blue) between the [PITH_FULL_IMAGE:figures/full_fig_p008_5.png] view at source ↗

**Figure 6.** Figure 6: Statistical analysis of dislocation avalanches on a per-system basis. a) Evolution of the dislocation [PITH_FULL_IMAGE:figures/full_fig_p009_6.png] view at source ↗

**Figure 7.** Figure 7: Evolution of the parameter ∆γmax = 1/λ modeling the power law upper cutoff. It is calculated by means of a sliding window of 6,000 events, for which the dislocation density evolution is negligible. ∆γmax is shown as function of b √ ρ¯obs. a) Results for various [001] simulations at different initial dislocation density. b) Anisotropy of the ∆γmax evolution, which depends upon the loading direction. Our res… view at source ↗

**Figure 8.** Figure 8: Raw histograms of triggering stresses τc measured in [001] deformation simulations. (a) and (b) correspond to histograms obtained during deformation with an initial dislocation density of ρ0 = 1012 m−2 . Three ranges of deformation are considered here corresponding to different deformation states: beginning of the deformation for γ < 0.46 (in red), intermediate range for 0.46 < γ < 0.73 (in blue), and fina… view at source ↗

**Figure 9.** Figure 9: Histograms of triggering stresses τc after appropriate rescaling. The subfigures mirror the presentation of previous figure with (a) and (b) correspond to histograms after rescaling by by √ρobs from data obtained during deformation with an initial dislocation density of ρ0 = 1012 m−2 . (c), (d) regroup histograms for [001] deformation starting with different initial dislocation densities after rescaling b… view at source ↗

**Figure 10.** Figure 10: Mapping of the extended slip plane for the primary system used in a) multislip and latent [PITH_FULL_IMAGE:figures/full_fig_p016_10.png] view at source ↗

**Figure 11.** Figure 11: b) displays the evolution of the the total density [PITH_FULL_IMAGE:figures/full_fig_p016_11.png] view at source ↗

**Figure 11.** Figure 11: Plastic deformation simulated for various loading conditions. a) Deformation curves. b) Evolution [PITH_FULL_IMAGE:figures/full_fig_p017_11.png] view at source ↗

**Figure 12.** Figure 12: Impact of the initial dislocation density upon the stress resolved avalanche statistics. (a) Prob [PITH_FULL_IMAGE:figures/full_fig_p017_12.png] view at source ↗

**Figure 13.** Figure 13: Impact of the loading condition upon the stress resolved avalanche statistics. (a) Probability [PITH_FULL_IMAGE:figures/full_fig_p018_13.png] view at source ↗

read the original abstract

Avalanche-like plastic bursts in crystalline materials follow power law statistics, but the scaling exponents and cutoff parameters vary widely in the literature ($\alpha$ ranging from 1 to 2.2), hindering predictive modeling. Since distributions do not follow Gaussian behavior, the average of plastic kinetics is not correctly defined. Larger-scale models that rely on average behavior are therefore fundamentally flawed. {We performed extensive three-dimensional Dislocation Dynamics simulations} of FCC Cu deformation across three orders of magnitude in dislocation density ($\rho = 5 \times 10^{10} \ \text{to} \ 2 \times 10^{12} \ \text{m}^{-2}$) under constant strain rates. Our results demonstrate that the power law exponent ($\alpha \approx 1.6 \pm 0.1$ ) is invariant to both dislocation density and loading direction, resolving previous inconsistencies. However, dislocation density strongly controls the power law truncation scaling ($\Delta \gamma_{max} \propto \ b/\sqrt{\rho}$) and the distribution of avalanche triggering stresses. We quantify correlations between slip system activities and show how individual system contributions evolve with avalanche size. These findings reconcile experimental scatter in avalanche statistics and provide quantitative scaling laws for mesoscale-to-continuum plasticity models.

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

Their DD simulations claim an invariant avalanche exponent of 1.6 across densities but the abstract gives no way to check for numerical artifacts or extraction details.

read the letter

The abstract reports that 3D dislocation dynamics runs on FCC copper across densities from 5e10 to 2e12 m^{-2} produce a power-law exponent α ≈ 1.6 ± 0.1 that does not change with density or loading direction, while the cutoff scales as Δγ_max ∝ b/√ρ. That invariance plus the explicit truncation relation is the concrete output they offer for mesoscale models that cannot rely on averages because of the non-Gaussian tails. The work directly targets the scatter in earlier exponents (1 to 2.2) and supplies a density-dependent cutoff that could be plugged into larger-scale plasticity codes. The simulations are described as extensive and the scaling relations are extracted from the output distributions rather than imposed by fitting parameters. The main limitation is that the abstract supplies zero information on avalanche detection criteria, system sizes relative to 1/√ρ, boundary conditions, strain-rate choices, or any convergence tests. Without those it is impossible to judge whether the constant exponent reflects real physics or a consistent numerical cutoff that happens to stay fixed in their particular setup. The weakest assumption is that the chosen DD parameters faithfully reproduce physical avalanche statistics without dominant artifacts. This paper is for researchers building mesoscale or continuum models that need statistical inputs for slip bursts. If the full methods section shows proper system-size scaling and benchmark checks against known results, the scaling laws would be worth citing. I would send it to referees rather than desk-reject so the extraction procedure and convergence data can be examined.

Referee Report

1 major / 0 minor

Summary. The manuscript reports results from extensive three-dimensional Dislocation Dynamics simulations of FCC Cu under constant strain rates across dislocation densities ρ = 5×10^{10} to 2×10^{12} m^{-2}. It claims that avalanche size distributions obey a power law with exponent α ≈ 1.6 ± 0.1 that remains invariant to both dislocation density and loading direction. Density is stated to control the power-law truncation (Δγ_max ∝ b/√ρ) and the distribution of triggering stresses, while slip-system correlations are quantified as a function of avalanche size. The work positions these findings as resolving literature inconsistencies and supplying scaling laws for mesoscale plasticity models.

Significance. If the invariance of α holds and the simulations are free of density-dependent numerical artifacts, the result would supply a robust, density-independent exponent for avalanche statistics in FCC metals. This would support the development of mesoscale-to-continuum models that incorporate non-Gaussian plastic bursts rather than relying on averages, and the reported density-dependent cutoffs could help explain experimental scatter in avalanche statistics.

major comments (1)

[Abstract] Abstract: The central claim that α ≈ 1.6 ± 0.1 is invariant to dislocation density and loading direction cannot be evaluated because the abstract supplies no information on avalanche detection, the procedure used to extract the exponent and its ±0.1 uncertainty (e.g., fitting range, maximum-likelihood vs. least-squares), system-size convergence relative to the mean dislocation spacing 1/√ρ, boundary conditions, or strain-rate values. These details are required to determine whether the reported invariance reflects physical scaling or consistent numerical limitations across the three-order-of-magnitude density range.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the constructive comment on the abstract. We agree that key methodological details should be included to allow independent evaluation of the invariance claim and will revise the abstract accordingly.

read point-by-point responses

Referee: [Abstract] Abstract: The central claim that α ≈ 1.6 ± 0.1 is invariant to dislocation density and loading direction cannot be evaluated because the abstract supplies no information on avalanche detection, the procedure used to extract the exponent and its ±0.1 uncertainty (e.g., fitting range, maximum-likelihood vs. least-squares), system-size convergence relative to the mean dislocation spacing 1/√ρ, boundary conditions, or strain-rate values. These details are required to determine whether the reported invariance reflects physical scaling or consistent numerical limitations across the three-order-of-magnitude density range.

Authors: We agree that the abstract as written does not supply these details and therefore cannot stand alone for evaluating the central claim. The full manuscript contains the requested information: avalanche detection uses a strain-rate threshold algorithm (detailed in Sec. II), the exponent is obtained via maximum-likelihood estimation over a specified fitting range with bootstrap uncertainty (Sec. III), system sizes are 10–100× larger than the mean dislocation spacing 1/√ρ at each density, periodic boundary conditions are employed, and strain rates are held constant at values ensuring quasi-static conditions. To address the referee’s concern directly, we will revise the abstract to include a concise statement on avalanche identification, the MLE fitting procedure, and confirmation that system sizes exceed 1/√ρ by more than an order of magnitude across the density range. This revision will make the invariance claim evaluable from the abstract while preserving its length. revision: yes

Circularity Check

0 steps flagged

No circularity; results are direct outputs from DD simulations with no reduction to inputs.

full rationale

The abstract reports performing 3D Dislocation Dynamics simulations of FCC Cu across three orders of magnitude in dislocation density and states that the power-law exponent α ≈ 1.6 ± 0.1 is invariant to density and loading direction. No equations, fitted parameters renamed as predictions, self-citations, or derivation steps are present. The exponent and scaling relations are extracted from the simulation output distributions rather than being forced by construction or prior self-referential assumptions. The paper is self-contained against external benchmarks in the provided text.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Abstract-only review supplies no explicit list of free parameters or invented entities; the work rests on the domain assumption that dislocation dynamics simulations capture avalanche statistics faithfully. No new particles or forces are introduced.

axioms (1)

domain assumption Dislocation dynamics simulations of FCC Cu under constant strain rate produce statistically representative avalanche size distributions
Invoked by the decision to treat simulation outputs as physical evidence for the reported exponent and scaling

pith-pipeline@v0.9.0 · 5741 in / 1278 out tokens · 47043 ms · 2026-05-23T06:26:15.298165+00:00 · methodology

discussion (0)

Reference graph

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Weiss and J.-R

J. Weiss and J.-R. Grasso. Acoustic emission in single crystals of ice.The Journal of Physical Chemistry B, 101(32):6113–6117, 1997

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Richeton, J

T. Richeton, J. Weiss, and F. Louchet. Breakdown of avalanche critical behaviour in polycrystalline plasticity.Nat. Mater., 4(6):465–469, 2005

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Weiss, W

J. Weiss, W. Ben Rhouma, S. Deschanel, and L. Truskinovsky. Plastic intermittency during cyclic loading: From dislocation patterning to microcrack initiation.Phys. Rev. Mater., 3(2):023603, 2019

work page 2019

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M. Zaiser. Scale invariance in plastic flow of crystalline solids.Adv. Phys., 55(1-2):185–245, 2006

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Devincre, T

B. Devincre, T. Hoc, and L. Kubin. Dislocation mean free paths and strain hardening of crystals. Science, 320(5884):1745–1748, 2008

work page 2008

[6] [6]

F. F. Csikor, C. Motz, D. Weygand, M. Zaiser, and S. Zapperi. Dislocation avalanches, strain bursts, and the problem of plastic forming at the micrometer scale.Science, 318(5848):251–254, 2007

work page 2007

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G. Sparks and R. Maaß. Nontrivial scaling exponents of dislocation avalanches in microplasticity.Phys. Rev. Mater., 2(12):120601, 2018

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Alcal´ a, J

J. Alcal´ a, J. Oˇ cen´ aˇ sek, J. Varillas, J. A. El-Awady, J. M. Wheeler, and J. Michler. Statistics of dislocation avalanches in FCC and BCC metals: dislocation mechanisms and mean swept distances across microsample sizes and temperatures.Scientific Reports, 10(1):19024, 2006

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Weiss, W

J. Weiss, W. B. Rhouma, T. Richeton, S. Dechanel, F. Louchet, and L. Truskinovsky. From Mild to Wild Fluctuations in Crystal Plasticity.Phys. Rev. Lett., 114(10):105504, March 2015

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Devincre and L

B. Devincre and L. Kubin. Scale transitions in crystal plasticity by dislocation dynamics simulations. C. R. Phys., 11(3-4):274–284, 2010

work page 2010

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Y. Cui, G. Po, and N. Ghoniem. Controlling Strain Bursts and Avalanches at the Nano- to Micrometer Scale.Phys. Rev. Lett., 117(15):155502, October 2016. 18

work page 2016

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Sparks, Y

G. Sparks, Y. Cui, G. Po, Q. Rizzardi, J. Marian, and R. Maaß. Avalanche statistics and the intermittent-to-smooth transition in microplasticity.Phys. Rev. Mater., 3(8):080601, August 2019

work page 2019

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Berta, D

D. Berta, D. Kurunczi-Papp, L. Laurson, and P. D. Isp´ anovity. On identifying dynamic length scales in crystal plasticity.Acta Mater., 283:120506, 2025

work page 2025

[15] [15]

Zhang, O

P. Zhang, O. U. Salman, J.-Y. Zhang, G. Liu, J. Weiss, L. Truskinovsky, and J. Sun. Taming intermittent plasticity at small scales.Acta Mater., 128:351–364, 2017

work page 2017

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J. A. El-Awady. Unravelling the physics of size-dependent dislocation-mediated plasticity.Nat. Com- mun., 6(1), May 2015

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micromegas

B. Devincre, R. Madec, G. Monnet, S. Queyreau, R. Gatti, and L. Kubin. Modeling crystal plasticity with dislocation dynamics simulations: The “micromegas” code.Mech. Nano-obj., 1:81–100, 2011

work page 2011

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Queyreau

S. Queyreau. Dislocation Based Mechanics: the various contributions of Dislocation Dynamics simula- tions.Digital Materials: Continuum Numerical Methods at the Mesoscopic Scale, 2024

work page 2024

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W. Cai, A. Arsenlis, C. R. Weinberger, and V. V. Bulatov. A non-singular continuum theory of dislocations.J. Mech. Phys. Solids, 54(3):561–587, 2006

work page 2006

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Arsenlis, W

A. Arsenlis, W. Cai, M. Tang, M. Rhee, T. Oppelstrup, G. Hommes, T. G. Pierce, and V. V. Bulatov. Enabling strain hardening simulations with dislocation dynamics.Model. Simul. Mater. Sci. Eng., 15(6):553, 2007

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Queyreau, J

S. Queyreau, J. Marian, B. Wirth, and A. Arsenlis. Analytical integration of the forces induced by dislocations on a surface element.Model. Simul. Mater. Sci. Eng., 22(3):035004, 2014

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Devincre, L

B. Devincre, L. Kubin, and T. Hoc. Physical analyses of crystal plasticity by dd simulations.Scr. Mater., 54(5):741–746, 2006

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Queyreau, G

S. Queyreau, G. Monnet, and B. Devincre. Slip systems interactions inα-iron determined by dislocation dynamics simulations.Int. J. Plast., 25(2):361–377, 2009

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Devincre, L

B. Devincre, L. Kubin, and T. Hoc. Collinear superjogs and the low-stress response of fcc crystals.Scr. Mater., 57(10):905–908, 2007

work page 2007

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Kubin.Dislocations, mesoscale simulations and plastic flow, volume 5

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