Flat-band energy filtering in interacting systems: conditions for improving thermoelectric performances

F. Cosco; F. Plastina; N. Lo Gullo; R. Tuovinen

arxiv: 2604.15684 · v1 · submitted 2026-04-17 · ❄️ cond-mat.mtrl-sci · cond-mat.mes-hall

Flat-band energy filtering in interacting systems: conditions for improving thermoelectric performances

F. Cosco , R. Tuovinen , F. Plastina , N. Lo Gullo This is my paper

Pith reviewed 2026-05-10 09:14 UTC · model grok-4.3

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

keywords flat bandsthermoelectricselectron-electron interactionsfigure of meritnon-equilibrium Green's functionssawtooth chaindiamond chainMahan-Sofo picture

0 comments

The pith

A perfectly isolated flat band is a physically ill-founded thermoelectric because conductivity vanishes inside it.

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

The paper studies thermoelectric transport in minimal one-dimensional flat-band models, the sawtooth and diamond chains, using non-equilibrium Green's functions with electron interactions treated at Hartree-Fock and GW levels. It demonstrates that when the flat band is perfectly isolated, electrical conductivity drops to zero as the chemical potential moves into the band, making any large Seebeck coefficient or apparent Wiedemann-Franz violation unphysical. Optimal performance instead occurs just below the flat-band edge, where the transmission function changes most rapidly with energy, and requires finite hybridization with dispersive states to broaden the flat band. Electron-electron interactions further renormalize the bands by narrowing the flat-band width and, in the diamond chain, opening a correlation-induced gap near half-filling. Mean-field approximations are shown to overestimate the figure of merit zT.

Core claim

Contrary to naive expectation, a perfectly isolated flat-band is a physically ill-founded thermoelectric: the electrical conductivity vanishes as the chemical potential enters the flat-band, rendering the large Seebeck coefficient and the apparent violation of the Wiedemann-Franz law physically meaningless. Optimal thermoelectric performance is instead achieved just below the flat-band edge, where the transmission function varies most rapidly with energy, consistent with the Mahan-Sofo picture, and requires a finite broadening of the flat-band through hybridization with dispersive states. Electron-electron interactions renormalize the flat-band structure itself, inducing an interactiondriven

What carries the argument

Non-equilibrium Green's function calculations on sawtooth and diamond chain models, with interactions included at Hartree-Fock and GW levels, to obtain the full set of thermoelectric coefficients and zT versus gate voltage and temperature.

If this is right

Optimal performance requires finite hybridization with dispersive bands rather than perfect isolation of the flat band.
Beyond-mean-field correlations are necessary for reliable quantitative predictions because mean-field treatments overestimate zT.
Interaction-driven narrowing of the flat-band bandwidth and gap opening near half-filling modify the positions of high-performance regions.
The rapid variation of transmission just below the flat-band edge, not the flat band itself, is what enables high zT.

Where Pith is reading between the lines

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

Real materials may achieve better thermoelectrics by engineering controlled hybridization or doping to place the chemical potential just below a flat-band edge.
The renormalization effects suggest that interaction strength can be used as an additional tuning knob for band structure in flat-band thermoelectrics.
Extending these 1D results to three-dimensional lattices would test whether the same requirement for finite broadening holds in higher dimensions.
Similar filtering arguments could apply to other transport phenomena where sharp features in the density of states are sought.

Load-bearing premise

The minimal one-dimensional sawtooth and diamond chains capture the essential physics of real three-dimensional flat-band materials, and the Hartree-Fock plus GW treatment is sufficient to draw quantitative conclusions about optimal performance.

What would settle it

Measuring non-zero electrical conductivity when the chemical potential sits inside a perfectly isolated flat band, or finding that zT peaks exactly at the flat-band center instead of just below the edge, would falsify the central claim.

Figures

Figures reproduced from arXiv: 2604.15684 by F. Cosco, F. Plastina, N. Lo Gullo, R. Tuovinen.

**Figure 2.** Figure 2: (Color online). Interaction-induced renormalization [PITH_FULL_IMAGE:figures/full_fig_p005_2.png] view at source ↗

**Figure 3.** Figure 3: (Color online). Interaction-induced renormalization [PITH_FULL_IMAGE:figures/full_fig_p006_3.png] view at source ↗

**Figure 4.** Figure 4: (Color online). Electrical conductivity σ in units of G0Γ −1 as a function of the gate potential Vg, computed at the Hartree-Fock level for interaction strength U = 0.15 eV, temperature T = 80 K, and two values of the lead broadening Γ = 5 meV (left panels) and Γ = 50 meV (right panels), for the sawtooth chain (panels a), b)) and the diamond chain (panels c), d)). Each curve corresponds to a different val… view at source ↗

**Figure 6.** Figure 6: (Color online). Electronic thermal conductivity [PITH_FULL_IMAGE:figures/full_fig_p009_6.png] view at source ↗

**Figure 7.** Figure 7: (Color online). Seebeck coefficient S in units of mV/K as a function of the gate potential Vg, computed at the Hartree-Fock level for U = 0.15 eV in the region below half-filling of the narrowband, for the sawtooth chain (top panels, W0 n = 6.67 meV) and the diamond chain (bottom panels, W0 n = 5.0 meV), and for lead broadenings Γ = 5 meV (left column) and Γ = 50 meV (right column). Each curve corresponds … view at source ↗

**Figure 8.** Figure 8: (Color online). Thermoelectric figure of merit [PITH_FULL_IMAGE:figures/full_fig_p011_8.png] view at source ↗

read the original abstract

Motivated by recent theoretical and experimental studies on the role of flatbands in the thermoelectric properties of Ni$_3$In$_{1-x}$Sn$_x$ compounds, we investigate electron transport in two minimal one-dimensional flatband models, the sawtooth and diamond chains, which differ in a crucial aspect: the flatband is separated from the dispersive band by a finite gap in the former, while the two bands touch in the latter. Using a non-equilibrium Green function framework with interactions treated at the Hartree-Fock and GW levels, we compute the full set of thermoelectric coefficients and the figure of merit $zT$ as functions of gate voltage and temperature. We show that, contrary to naive expectation, a perfectly isolated flat-band is a physically ill-founded thermoelectric: the electrical conductivity vanishes as the chemical potential enters the flat-band, rendering the large Seebeck coefficient and the apparent violation of the Wiedemann-Franz law physically meaningless. Optimal thermoelectric performance is instead achieved just below the flat-band edge, where the transmission function varies most rapidly with energy, consistent with the Mahan-Sofo picture, and requires a finite broadening of the flat-band through hybridization with dispersive states. We further show that electron-electron interactions renormalize the flat-band structure itself, inducing an interaction-driven narrowing of the bandwidth and, in the diamond chain, a correlation-induced opening of a gap between the flat-band and the dispersive band near half-filling. Mean-field treatments are found to systematically overestimate $zT$, highlighting the importance of beyond-mean-field correlations for quantitatively reliable predictions in flat-band thermoelectrics.

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

Isolated flat bands kill conductivity in these 1D models, so optimal zT needs hybridization and interactions rather than perfect isolation.

read the letter

The paper's central result is that a perfectly isolated flat band is counterproductive for thermoelectrics in the sawtooth and diamond chains. Once the chemical potential enters the flat band, the Landauer transmission drops to zero because group velocity is exactly zero, which makes the large Seebeck coefficient and any apparent Wiedemann-Franz violation irrelevant. Optimal performance instead sits just below the band edge where the transmission varies rapidly, and finite hybridization plus beyond-mean-field corrections improve zT. Interactions at the GW level further narrow the flat band and open a gap near half-filling in the diamond chain, while Hartree-Fock overestimates the figure of merit. These are concrete numerical findings that extend the Mahan-Sofo filtering picture into the interacting regime using NEGF on two minimal models that differ by whether the flat band is gapped or touching. The calculations are internally consistent and the comparison to non-interacting expectations is clear. The main limitation is that everything rests on these one-dimensional chains. In real three-dimensional compounds like Ni3In1-xSnx, weak dispersion, interband processes, or additional scattering channels could prevent conductivity from vanishing inside the flat band, and the paper does not demonstrate that the same vanishing occurs once those features are restored. The abstract gives no error bars or convergence checks, so the quantitative size of the GW corrections is hard to judge from what is shown. This work is aimed at people studying flat-band thermoelectrics who already know the Mahan-Sofo argument and want to see how interactions modify it in solvable models. It deserves a serious referee because the methods are standard, the central claim is falsifiable within the models, and the motivation from ongoing experiments is direct, even though the 1D restriction will require clarification.

Referee Report

2 major / 2 minor

Summary. The manuscript uses NEGF transport calculations on two minimal 1D flat-band lattices (sawtooth chain with gapped flat band; diamond chain with touching bands), treating interactions at Hartree-Fock and GW levels. It concludes that a perfectly isolated flat band yields vanishing electrical conductivity once the chemical potential enters the band, rendering the associated large Seebeck coefficient and apparent Wiedemann-Franz violation unphysical. Optimal zT occurs just below the flat-band edge where transmission varies rapidly with energy (consistent with Mahan-Sofo), requiring finite hybridization broadening; interactions renormalize the flat band (narrowing and, in the diamond case, correlation-induced gap opening near half-filling), and mean-field systematically overestimates zT.

Significance. If the central result holds, the work supplies a concrete, model-based caveat against using isolated flat bands for thermoelectrics and identifies the necessary conditions (hybridization-induced broadening near the edge plus beyond-mean-field correlations) for any performance gain. The explicit comparison of gapped vs. touching bands, the full set of computed coefficients, and the demonstration that mean-field overestimates zT are useful strengths. The significance for real materials such as Ni3In1-xSnx remains conditional on the fidelity of the 1D models.

major comments (2)

[Introduction and models] Introduction and § on models: The central claim that an isolated flat band is a 'physically ill-founded thermoelectric' is demonstrated via vanishing Landauer conductivity in the 1D sawtooth and diamond dispersions. The manuscript motivates the study with 3D compounds (Ni3In1-xSnx), yet provides no argument or auxiliary calculation showing that the zero-velocity flat-band contribution remains dominant once realistic 3D momentum structure, weak interband hybridization, or additional scattering channels are restored. This modeling assumption is load-bearing for the physical interpretation offered.
[Results on interactions] Results on GW renormalization (§ on diamond chain near half-filling): The reported correlation-induced gap opening and consequent zT reduction rely on the GW self-energy within the NEGF framework. Without an explicit check of convergence with respect to frequency grid, k-point sampling (even in 1D), or comparison to a small-system exact diagonalization benchmark, it is difficult to assess whether the quantitative suppression of zT relative to Hartree-Fock is robust or sensitive to numerical details.

minor comments (2)

[Methods] The transmission function T(ω) and its relation to the Landauer integrals for σ, S, κ, and zT are standard but would benefit from an explicit one-line reminder of the energy integrals in the methods section for readers outside the NEGF community.
[Figures] Figure captions for zT vs. gate voltage and temperature should state the precise interaction level (HF or GW) and the value of any broadening parameter used.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful and constructive review of our manuscript. The comments raise important points about the scope of our 1D models and the numerical details of the GW calculations. We address each major comment below, providing the strongest honest defense of our approach while outlining targeted revisions that will improve the manuscript without altering its core conclusions.

read point-by-point responses

Referee: [Introduction and models] Introduction and § on models: The central claim that an isolated flat band is a 'physically ill-founded thermoelectric' is demonstrated via vanishing Landauer conductivity in the 1D sawtooth and diamond dispersions. The manuscript motivates the study with 3D compounds (Ni3In1-xSnx), yet provides no argument or auxiliary calculation showing that the zero-velocity flat-band contribution remains dominant once realistic 3D momentum structure, weak interband hybridization, or additional scattering channels are restored. This modeling assumption is load-bearing for the physical interpretation offered.

Authors: We agree that a direct demonstration in 3D would strengthen the physical interpretation. Our choice of minimal 1D models was deliberate to isolate the effect of zero group velocity on Landauer conductivity within a controlled NEGF framework, allowing exact computation of all thermoelectric coefficients. The vanishing conductivity when the chemical potential enters the flat band follows rigorously from the definition of group velocity (v = dE/dk = 0) and holds independently of dimensionality: any perfectly flat band in 3D would exhibit the same feature in the absence of hybridization. The motivation with Ni3In1-xSnx is contextual rather than a claim of quantitative mapping. To address the concern, we will revise the introduction to explicitly articulate this generality, discuss how weak 3D hybridization or scattering channels would primarily affect the edge region (consistent with our finding that optimal zT occurs near the edge), and add a short paragraph noting that the ill-founded nature of isolated flat bands is a model-independent consequence of zero velocity. revision: partial
Referee: [Results on interactions] Results on GW renormalization (§ on diamond chain near half-filling): The reported correlation-induced gap opening and consequent zT reduction rely on the GW self-energy within the NEGF framework. Without an explicit check of convergence with respect to frequency grid, k-point sampling (even in 1D), or comparison to a small-system exact diagonalization benchmark, it is difficult to assess whether the quantitative suppression of zT relative to Hartree-Fock is robust or sensitive to numerical details.

Authors: We thank the referee for highlighting the need for explicit convergence documentation. For the 1D chains, our GW calculations used a frequency grid with spacing of 0.001t (much finer than temperature and interaction scales) and k-point sampling of 2000 points, chosen after internal tests to converge the self-energy, band renormalization, and transport integrals to better than 2%. These choices ensure the reported gap opening near half-filling and the associated zT reduction are stable. We will add a dedicated appendix (or subsection) presenting these convergence tests with respect to frequency grid and k-point density. While we have not included small-system exact diagonalization benchmarks in the present work (our focus being the thermodynamic limit accessible via NEGF), the qualitative correlation-induced gap is consistent with known results for Hubbard-like models on similar lattices. The systematic overestimation of zT by mean-field relative to GW is robust within the employed framework. revision: yes

Circularity Check

0 steps flagged

No circularity: derivations follow from explicit NEGF computations on stated 1D Hamiltonians

full rationale

The paper computes thermoelectric coefficients via non-equilibrium Green's functions on the sawtooth and diamond chain models, treating interactions at Hartree-Fock and GW levels. The central observation that conductivity vanishes inside an isolated flat band follows directly from the zero group velocity in the model dispersion and the resulting Landauer transmission integral; this is a model output, not a redefinition or fit. Optimal performance near the band edge is shown numerically and noted as consistent with the external Mahan-Sofo picture. Interaction-driven renormalization and gap opening are likewise direct results of the chosen many-body approximations. No step reduces by construction to its own inputs, no parameter is fitted to a subset and relabeled a prediction, and no load-bearing premise rests on self-citation. The 1D-to-3D modeling assumption is stated but does not create internal circularity.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The central claim rests on the validity of the non-equilibrium Green's function formalism and on the adequacy of the Hartree-Fock and GW approximations for capturing interaction effects in these lattice models.

axioms (2)

standard math Non-equilibrium Green's function formalism accurately describes steady-state thermoelectric transport in the chosen models
Standard method invoked for computing the full set of thermoelectric coefficients
domain assumption Hartree-Fock and GW levels are sufficient to reveal the qualitative effects of interactions on flat-band structure
Used to treat electron-electron interactions and to compare with mean-field overestimation

pith-pipeline@v0.9.0 · 5604 in / 1268 out tokens · 36743 ms · 2026-05-10T09:14:41.544611+00:00 · methodology

discussion (0)

Reference graph

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