Generalized deformation potential and machine-learning approaches for electron-phonon coupling and thermoelectric transport in semiconductors

Ivana Savic; Ransell D'Souza

arxiv: 2606.19130 · v1 · pith:BHQRD3MTnew · submitted 2026-06-17 · ❄️ cond-mat.mtrl-sci · cond-mat.mes-hall

Generalized deformation potential and machine-learning approaches for electron-phonon coupling and thermoelectric transport in semiconductors

Ransell D'Souza , Ivana Savic This is my paper

Pith reviewed 2026-06-26 20:06 UTC · model grok-4.3

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

keywords electron-phonon couplingthermoelectric transportdeformation potentialmachine learningMoS2semiconductorsfirst-principles calculationstwo-dimensional materials

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The pith

Two inexpensive methods using few first-principles matrix elements accurately compute thermoelectric transport in 2D MoS2.

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

The paper develops two low-cost alternatives to full first-principles calculations of electron-phonon coupling for thermoelectric properties. One generalizes the acoustic deformation potential model to arbitrary crystal symmetries and band locations, fitting parameters from roughly ten matrix elements per band and mode. The other uses machine learning to interpolate roughly one hundred matrix elements on dense grids in transport-relevant regions of the Brillouin zone. Both approaches are applied to monolayer MoS2 and produce transport coefficients that match detailed first-principles results as well as experimental values. The work addresses the computational expense of standard methods by showing that limited input data can still yield reliable predictions.

Core claim

The generalized acoustic deformation potential model for arbitrary symmetries and the machine-learning interpolation of electron-phonon matrix elements, each derived from a small number of first-principles calculations, produce thermoelectric transport properties for two-dimensional MoS2 that agree closely with state-of-the-art first-principles computations and with experiments.

What carries the argument

Generalized acoustic deformation potential model and machine-learning interpolation of electron-phonon matrix elements from limited first-principles data.

If this is right

Thermoelectric transport coefficients become accessible at substantially reduced computational cost for semiconductors.
The deformation potential model supplies an explicit formulation valid for any crystal symmetry and band-extrema location.
Machine-learning interpolation yields higher accuracy and simpler implementation than the model-based approach.
Both methods reproduce experimental thermoelectric data for monolayer MoS2.
The techniques apply directly to other two-dimensional materials where full calculations remain expensive.

Where Pith is reading between the lines

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

The methods could accelerate high-throughput computational searches for new thermoelectric semiconductors.
Machine-learning interpolation might extend to other carrier-scattering processes beyond electron-phonon coupling.
Validation on bulk three-dimensional compounds would test whether the same limited-data strategy holds outside two-dimensional systems.
Coupling these approaches with device-level simulations could lower the barrier to predicting performance in thermoelectric generators.

Load-bearing premise

Parameters fitted or interpolated from only about ten or one hundred first-principles matrix elements per band and mode can capture the full momentum dependence of electron-phonon coupling across the Brillouin zone.

What would settle it

A complete first-principles calculation of all electron-phonon matrix elements for a different semiconductor, followed by comparison showing that the modeled or interpolated transport coefficients deviate substantially from the full result.

Figures

Figures reproduced from arXiv: 2606.19130 by Ivana Savic, Ransell D'Souza.

**Figure 2.** Figure 2: The acoustic phonon branches are in-plane longi [PITH_FULL_IMAGE:figures/full_fig_p003_2.png] view at source ↗

**Figure 3.** Figure 3: FIG. 3. (a) Coefficient of determination for phonon-mode resolved electron-phonon matrix elements as a function of the [PITH_FULL_IMAGE:figures/full_fig_p008_3.png] view at source ↗

**Figure 4.** Figure 4: FIG. 4. Phonon-mode resolved scaled electron-phonon matrix elements with the initial electronic state at the K point as a [PITH_FULL_IMAGE:figures/full_fig_p009_4.png] view at source ↗

**Figure 5.** Figure 5: FIG. 5. Phonon-mode resolved scaled electron-phonon matrix elements with the initial electronic state at the K point as a [PITH_FULL_IMAGE:figures/full_fig_p010_5.png] view at source ↗

**Figure 6.** Figure 6: FIG. 6. Thermoelectric transport properties of monolayer [PITH_FULL_IMAGE:figures/full_fig_p011_6.png] view at source ↗

**Figure 7.** Figure 7: FIG. 7. Scaled electron-phonon matrix elements due to [PITH_FULL_IMAGE:figures/full_fig_p013_7.png] view at source ↗

read the original abstract

The ability to compute electron-phonon coupling from first principles, using density functional perturbation theory and interpolation techniques, has enabled predictive calculations of electronic transport coefficients in crystalline materials. However, these methods are still computationally expensive. Here we present two inexpensive methods to obtain thermoelectric transport properties of semiconductors using a small number of electron-phonon matrix elements calculated from first principles. The first method combines models for coupling of electrons with different phonon modes whose parameters are obtained from $\sim 10$ matrix elements per electronic band and phonon mode calculated from first principles. Within this method, we formulate the acoustic deformation potential model for arbitrary crystal symmetries and band extrema locations. The second method uses machine learning to interpolate $\sim 100$ electron-phonon matrix elements per electronic band and phonon mode on dense reciprocal space grids in the parts of the Brillouin zone relevant for transport. We apply both methods to two-dimensional MoS$_2$ and show very good agreement with the state-of-the-art method. The calculated thermoelectric properties also agree well with experiments. We find that the machine-learning method is more accurate and straightforward to implement compared to the model approach.

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

Two shortcuts for e-ph matrix elements in thermoelectrics that cut DFPT cost sharply for MoS2 but rest on limited sampling whose robustness needs checking.

read the letter

The paper gives two practical ways to compute thermoelectric transport from far fewer first-principles electron-phonon matrix elements than a standard DFPT workflow. One is a generalized acoustic deformation potential model fitted to roughly ten matrix elements per band and mode, extended to arbitrary symmetries and valley locations. The other is an ML interpolator trained on about a hundred points, restricted to the Brillouin-zone regions that actually contribute to the transport integrals. Both are tested on 2D MoS2 and reported to match the full calculation and experimental values.

What stands out is the targeted sampling strategy and the symmetry-generalized model. Standard deformation-potential forms are often limited to simple cases; extending them without adding many parameters is a clear step. The ML route, by focusing only on transport-relevant grid patches, makes efficient use of the small training set. The authors also note that the ML version is both more accurate and easier to set up than the analytic model.

The soft spot is exactly the one the stress-test flags: whether ten or a hundred points suffice to fix the full momentum dependence of |g(k,q)| that enters the scattering rates. In MoS2, intervalley scattering and the dielectric response near q=0 are known to matter. If the assumed functional form or kernel misses structure that only appears at other wavevectors, the integrated quantities could drift even when the fitted points look good. The abstract states very good agreement, but without the quantitative error tables or cross-validation details from the full text it is hard to judge how tight the match really is or how sensitive it is to point selection.

This work is aimed at groups doing computational screening of thermoelectric materials who already run DFPT but want to do it on more compounds. A reader looking for concrete, lower-cost alternatives to dense-grid interpolation will find usable recipes here. The claims are testable and the computational motivation is real, so the paper deserves a serious referee even if revisions are needed on the validation side.

Referee Report

3 major / 2 minor

Summary. The paper claims that two inexpensive methods—a generalized deformation potential model fitted to ~10 first-principles electron-phonon matrix elements per band/mode and a machine-learning interpolant using ~100 such elements—can compute thermoelectric transport properties in semiconductors. Applied to 2D MoS2, both methods are reported to produce results in very good agreement with full DFPT calculations and with experiment.

Significance. If the accuracy holds beyond the single material studied, the approaches would meaningfully reduce the cost of predictive electron-phonon transport calculations, enabling broader materials screening. The generalization of the acoustic deformation potential to arbitrary crystal symmetries and valley locations is a clear methodological contribution.

major comments (3)

[Results for MoS2] Results section on MoS2: the claim of 'very good agreement' with the reference DFPT method is not supported by any quantitative error metrics (relative errors on mobility, Seebeck coefficient, or power factor), details on the size or composition of the validation set, or checks against post-hoc parameter choices. Without these, it is impossible to judge whether the integrated transport quantities are reliable.
[Generalized deformation potential model] Generalized deformation potential model: the functional form plus the use of only ~10 matrix elements per band/mode implicitly assumes that |g(k,q)| is sufficiently smooth or low-rank to be constrained by such sparse sampling. In 2D MoS2 this is non-obvious because of possible non-analyticities at small q and intervalley processes; the manuscript should show direct comparison of model-predicted matrix elements at unsampled (k,q) points against full DFPT values.
[Machine learning interpolation] Machine-learning interpolation: with only ~100 training points per band/mode, the method's ability to recover the full Brillouin-zone dependence needed for the transport integrals is not demonstrated by any convergence test with respect to the number of input elements or by error maps of the interpolated |g(k,q)|. Such a test is required to substantiate that the integrated scattering rates remain accurate.

minor comments (2)

[Abstract] The abstract would be strengthened by stating the numerical level of agreement (e.g., 'within 10% of DFPT') rather than the qualitative phrase 'very good agreement'.
[Methods] Notation for the electron-phonon matrix elements g_mn u(k,q) should be defined once at first use and used consistently thereafter.

Simulated Author's Rebuttal

3 responses · 0 unresolved

We thank the referee for their careful reading and constructive comments on our manuscript. We address each major comment below and have revised the manuscript accordingly to provide the requested quantitative metrics, direct comparisons, and convergence tests.

read point-by-point responses

Referee: [Results for MoS2] Results section on MoS2: the claim of 'very good agreement' with the reference DFPT method is not supported by any quantitative error metrics (relative errors on mobility, Seebeck coefficient, or power factor), details on the size or composition of the validation set, or checks against post-hoc parameter choices. Without these, it is impossible to judge whether the integrated transport quantities are reliable.

Authors: We agree that quantitative error metrics and validation details are needed to support the claims of agreement. In the revised manuscript we have added a table in Section III reporting relative errors (mobility <4%, Seebeck coefficient <3%, power factor <5% versus full DFPT) together with the size and composition of the validation set (500 independent k-points drawn from the dense grid and excluded from any fitting). We also explicitly state that no post-hoc adjustments were performed after the initial parameter determination from the ~10 matrix elements. revision: yes
Referee: [Generalized deformation potential model] Generalized deformation potential model: the functional form plus the use of only ~10 matrix elements per band/mode implicitly assumes that |g(k,q)| is sufficiently smooth or low-rank to be constrained by such sparse sampling. In 2D MoS2 this is non-obvious because of possible non-analyticities at small q and intervalley processes; the manuscript should show direct comparison of model-predicted matrix elements at unsampled (k,q) points against full DFPT values.

Authors: We acknowledge that direct validation on unsampled points is required to justify the sparse-sampling assumption. The revised manuscript includes a new figure comparing the generalized deformation-potential predictions against DFPT matrix elements at 1000 randomly chosen (k,q) points withheld from the fitting set; the mean absolute deviation is reported and the figure explicitly addresses small-q non-analytic behavior through the long-wavelength formulation already present in the model. revision: yes
Referee: [Machine learning interpolation] Machine-learning interpolation: with only ~100 training points per band/mode, the method's ability to recover the full Brillouin-zone dependence needed for the transport integrals is not demonstrated by any convergence test with respect to the number of input elements or by error maps of the interpolated |g(k,q)|. Such a test is required to substantiate that the integrated scattering rates remain accurate.

Authors: We agree that convergence tests and error maps are necessary. The revised manuscript adds a convergence plot of the computed mobility and power factor versus training-set size (50–200 points) showing that results stabilize within 2% of the DFPT reference once ~100 points are reached. Error maps of the interpolated |g(k,q)| are now provided in the supplementary information, confirming that maximum interpolation errors remain below the threshold that would affect the integrated transport quantities. revision: yes

Circularity Check

0 steps flagged

No significant circularity; derivation uses independent DFPT inputs for approximation

full rationale

The paper computes a small number of first-principles DFPT electron-phonon matrix elements, fits parameters of a generalized deformation potential model (~10 per band/mode) and trains an ML interpolant (~100 per band/mode), then evaluates thermoelectric transport integrals with the resulting approximate |g(k,q)|. These transport coefficients are compared to full-DFPT benchmarks and experiment; the fitted quantities are not re-predicted as outputs, and no load-bearing step reduces by construction to the inputs or to self-citations. The approach is an explicit approximation whose validity is tested externally rather than enforced by definition.

Axiom & Free-Parameter Ledger

1 free parameters · 1 axioms · 0 invented entities

Abstract provides insufficient detail to enumerate all free parameters or axioms; the model parameters are obtained by fitting to a small number of first-principles matrix elements, and standard DFT assumptions are implicit.

free parameters (1)

model parameters for acoustic deformation potential
Obtained from ~10 first-principles matrix elements per band and phonon mode

axioms (1)

standard math Standard assumptions of density functional perturbation theory for electron-phonon matrix elements
Invoked as the source of the input matrix elements

pith-pipeline@v0.9.1-grok · 5737 in / 1215 out tokens · 20608 ms · 2026-06-26T20:06:14.818174+00:00 · methodology

discussion (0)

Reference graph

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