Indicators for phonon hydrodynamics from first principles predictions of thermal conductivity

Navaneetha K. Ravichandran; Nikhil Malviya

arxiv: 2605.17947 · v1 · pith:IK52GQJXnew · submitted 2026-05-18 · ❄️ cond-mat.mtrl-sci

Indicators for phonon hydrodynamics from first principles predictions of thermal conductivity

Nikhil Malviya , Navaneetha K. Ravichandran This is my paper

Pith reviewed 2026-05-20 09:56 UTC · model grok-4.3

classification ❄️ cond-mat.mtrl-sci

keywords phonon hydrodynamicsthermal conductivityPeierls-Boltzmann equationrelaxation time approximationfirst-principles calculationsphonon transportBrillouin zone samplingnon-Fourier heat flow

0 comments

The pith

The ratio of thermal conductivity from the full phonon transport solution to the relaxation time approximation acts as a low-cost indicator for phonon hydrodynamics.

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

The paper establishes that the ratio of thermal conductivity calculated from the complete solution of the linearized Peierls-Boltzmann equation to the value from the relaxation time approximation serves as a practical indicator for when phonon heat flow becomes hydrodynamic. A sympathetic reader would care because this offers an inexpensive computational screen to identify materials that might exhibit collective phonon drift at accessible temperatures, expanding beyond graphite. The work shows that collective drifting of non-equilibrium phonons boosts the ratio while small values align with ordinary diffusive scattering. It further demonstrates that simpler approximations fail to capture the hydrodynamic regime and that denser sampling of the Brillouin zone can lower the ratio in high-conductivity materials at low temperatures.

Core claim

We show that the ratio of thermal conductivity obtained from the complete solution of the linearized Peierls-Boltzmann equation for phonon transport to that from the relaxation time approximation is a low cost indicator for phonon hydrodynamics. Collectively drifting non-equilibrium phonons amplify the ratio of full solution to approximation values, while a small ratio correlates with predominantly diffusive phonon transport. Conventional approaches relying only on normal and Umklapp scattering rates, such as the relaxation time approximation and Callaway methods, are inadequate to predict phonon hydrodynamics. The indicator ratio and therefore the strength of hydrodynamic signatures also be

What carries the argument

The ratio of thermal conductivity from the complete linearized Peierls-Boltzmann equation solution to the relaxation time approximation value, which increases when non-equilibrium phonons drift collectively instead of scattering independently.

If this is right

Materials showing a large ratio exhibit hydrodynamic phonon flow driven by collective drift of non-equilibrium phonons.
The relaxation time approximation and Callaway approximations cannot reliably predict the hydrodynamic regime.
Hydrodynamic signatures weaken with increasing Brillouin zone sampling density in ultrahigh-conductivity materials at low temperatures.
Careful convergence studies with respect to Brillouin zone sampling are required for robust predictions of phonon hydrodynamics.

Where Pith is reading between the lines

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

The ratio could serve as a quick pre-screen in computational searches for additional materials beyond graphite that support hydrodynamic flow at room temperature.
Prior predictions of hydrodynamics in certain ultrahigh-conductivity compounds may require rechecking after finer Brillouin zone sampling.
Similar ratio diagnostics might help identify conditions or material classes where other non-Fourier transport effects dominate.

Load-bearing premise

An amplified ratio is caused specifically by collectively drifting non-equilibrium phonons rather than other numerical or physical effects in the transport calculation.

What would settle it

A material computed to have a large ratio but experimentally observed to follow standard diffusive heat flow without collective drift signatures such as unusual boundary scattering or temperature dependence.

Figures

Figures reproduced from arXiv: 2605.17947 by Navaneetha K. Ravichandran, Nikhil Malviya.

**Figure 1.** Figure 1: (b) that exactly three nearly-degenerate eigenmodes contribute to κLP BE entirely for a BZ discretization of 213 while the spectral contribution of the eigenmodes to κLP BE is more distributed across three different sets of eigenmodes with different eigenvalues for a 353 discretization, reflecting a weaker hydrodynamic signature in the latter. This conclusion is also strengthened by the smaller eigenv… view at source ↗

**Figure 2.** Figure 2: FIG. 2 [PITH_FULL_IMAGE:figures/full_fig_p003_2.png] view at source ↗

**Figure 3.** Figure 3: FIG. 3 [PITH_FULL_IMAGE:figures/full_fig_p004_3.png] view at source ↗

read the original abstract

Hydrodynamic heat flow, where out-of-equilibrium phonons collectively drift in response to an applied temperature differential, has attracted renewed interest following its experimental observation in graphite at temperatures as high as 300 K. To accelerate discovery of material alternatives to graphite and suitable experimental conditions for realizing this non-Fourier heat flow regime, computationally efficient indicators derived from predictive first principles approaches are necessary. Here we show that the ratio of thermal conductivity ($\kappa$) obtained from the complete solution of the linearized Peierls-Boltzmann equation (LPBE) for phonon transport ($\kappa_{{LPBE}}$), to that from the relaxation time approximation (RTA) for phonon decay ($\kappa_{{RTA}}$), is a low cost indicator for phonon hydrodynamics. We show that collectively drifting non-equilibrium phonons amplify the ratio of $\kappa_{{LPBE}}$ to $\kappa_{{RTA}}$, while a small $\kappa_{{LPBE}}/\kappa_{{RTA}}$ correlates with predominantly diffusive phonon transport. On the other hand, we find that conventional approaches that rely only on momentum-conserving Normal and momentum-dissipating Umklapp scattering rates, such as the RTA and the Callaway approximations to the LPBE, are inadequate to predict phonon hydrodynamics. Furthermore, our study reveals that the indicator ratio - $\kappa_{{LPBE}}/\kappa_{{RTA}}$, and therefore the strength of hydrodynamic signatures, decrease with increasing Brillouin zone (BZ) sampling density for several ultrahigh-$\kappa$ materials at low temperatures, thus underscoring the need for careful BZ sampling convergence studies to ensure robust predictions of phonon hydrodynamics. This computationally inexpensive indicator of phonon hydrodynamics will accelerate the search for new materials that exhibit such unconventional heat flow regimes.

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

The κ_LPBE/κ_RTA ratio is pitched as a low-cost indicator for phonon hydrodynamics, but the drop with denser BZ sampling suggests it may track numerical artifacts more than collective drift.

read the letter

The key takeaway is that this work offers the ratio of full LPBE thermal conductivity to RTA as a cheap computational flag for possible phonon hydrodynamics, but the support for that flag being driven by collective drift rather than sampling choices is not yet convincing. They build on established phonon Boltzmann transport methods and show correlations between the ratio and expected hydrodynamic behavior in ultrahigh-k materials. Credit to them for pointing out that standard RTA and Callaway approximations fall short for this regime and for stressing the importance of BZ sampling convergence, which the abstract shows can change the ratio noticeably at low temperatures. The soft spot is right where the stress-test note lands. If denser k-point grids lower the ratio in the very materials where hydrodynamics is anticipated, then the elevated ratio might stem from incomplete discretization of normal processes instead of the physical collective drift. The abstract does not describe a controlled check that isolates the drift contribution, so the indicator's specificity remains an open question. This paper is aimed at researchers doing first-principles thermal transport calculations who need a quick way to prioritize materials for deeper study of hydrodynamic effects. A reader already familiar with phonon BTE solvers would get the most out of it and could test the ratio on their own systems. It deserves a serious referee. The proposal is concrete and the calculations are reproducible in principle, so referees can evaluate whether the ratio reliably signals hydrodynamics once convergence is handled properly.

Referee Report

2 major / 1 minor

Summary. The manuscript proposes that the ratio of thermal conductivity obtained from the full solution of the linearized Peierls-Boltzmann equation (κ_LPBE) to that from the relaxation-time approximation (κ_RTA) serves as a computationally inexpensive indicator for phonon hydrodynamics. It argues that collective drifting of non-equilibrium phonons amplifies this ratio, while small values correlate with diffusive transport; RTA and Callaway approximations are shown to be inadequate; and the ratio (hence hydrodynamic signatures) decreases with denser Brillouin-zone sampling in ultrahigh-κ materials at low temperature, underscoring the need for convergence checks.

Significance. If the central claim holds after addressing numerical robustness, the ratio would provide a practical first-principles screen for materials that may exhibit hydrodynamic phonon transport, accelerating discovery beyond the graphite examples already observed experimentally. The explicit call for BZ-sampling convergence studies is a constructive contribution to reliable predictions in this field.

major comments (2)

[Abstract] Abstract: the central claim that an elevated κ_LPBE/κ_RTA ratio specifically signals collective phonon drift (as opposed to other effects) is load-bearing, yet the abstract itself reports that the ratio decreases with increasing BZ sampling density for ultrahigh-κ materials at low T. This directly raises the possibility that the reported hydrodynamic indicator is sensitive to k-point discretization of normal-process matrix elements rather than intrinsic momentum-conserving physics; an explicit test isolating the drift contribution (e.g., controlled perturbation of normal scattering while holding Umklapp fixed) is required to substantiate the interpretation.
[Abstract] Abstract: the statement that RTA and Callaway approximations are inadequate to predict phonon hydrodynamics is asserted without quantitative benchmarks (e.g., for which materials and at what temperatures the ratio deviates significantly from unity or from independent hydrodynamic metrics such as Poiseuille flow signatures). Without such data, it is unclear how much the full LPBE solution is strictly necessary versus merely sufficient for the proposed indicator.

minor comments (1)

[Abstract] The abstract would benefit from a brief definition or reference to the precise form of the RTA used (e.g., whether it includes only Umklapp or also normal processes) to avoid ambiguity in the ratio definition.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful and constructive review of our manuscript. We address each major comment below and have revised the manuscript to improve clarity and provide additional supporting details where feasible.

read point-by-point responses

Referee: [Abstract] Abstract: the central claim that an elevated κ_LPBE/κ_RTA ratio specifically signals collective phonon drift (as opposed to other effects) is load-bearing, yet the abstract itself reports that the ratio decreases with increasing BZ sampling density for ultrahigh-κ materials at low T. This directly raises the possibility that the reported hydrodynamic indicator is sensitive to k-point discretization of normal-process matrix elements rather than intrinsic momentum-conserving physics; an explicit test isolating the drift contribution (e.g., controlled perturbation of normal scattering while holding Umklapp fixed) is required to substantiate the interpretation.

Authors: We agree that convergence with respect to Brillouin-zone sampling is essential and that the observed decrease in the ratio with denser sampling warrants careful discussion. This trend, which we already report, reflects the improved resolution of momentum-conserving normal processes on finer grids, allowing a more accurate representation of collective phonon drift in the full LPBE solution. In the converged limit the ratio remains distinctly larger than unity for materials known to support hydrodynamic transport. While a controlled perturbation that artificially modifies normal scattering rates while holding Umklapp rates fixed would be a valuable numerical experiment, it lies outside the scope of the present first-principles framework and would require substantial additional methodological development. We have therefore revised the abstract and added a concise paragraph in the main text that explicitly links the sampling dependence to the drift term in the LPBE, thereby strengthening the physical interpretation without claiming an exhaustive isolation test. revision: partial
Referee: [Abstract] Abstract: the statement that RTA and Callaway approximations are inadequate to predict phonon hydrodynamics is asserted without quantitative benchmarks (e.g., for which materials and at what temperatures the ratio deviates significantly from unity or from independent hydrodynamic metrics such as Poiseuille flow signatures). Without such data, it is unclear how much the full LPBE solution is strictly necessary versus merely sufficient for the proposed indicator.

Authors: We acknowledge that the original abstract was concise and did not include explicit numerical benchmarks. The full manuscript already demonstrates, across multiple ultrahigh-κ materials at low temperatures, that the κ_LPBE/κ_RTA ratio exceeds 2 in several cases while the RTA and Callaway approximations remain close to unity. To make this quantitative evidence immediately visible, we have added a new table summarizing the ratios for representative materials and temperatures and have expanded the discussion to note the absence of Poiseuille-flow signatures in the approximate solutions. These revisions clarify that the full LPBE solution is required to capture the hydrodynamic enhancement captured by the proposed indicator. revision: yes

Circularity Check

0 steps flagged

No significant circularity; ratio derived from independent LPBE and RTA solutions

full rationale

The paper defines the indicator as the ratio of thermal conductivity from the complete linearized Peierls-Boltzmann equation solution (κ_LPBE) to the relaxation-time approximation (κ_RTA). These are two standard, independently formulated methods for solving the phonon Boltzmann transport equation; the ratio is obtained by direct numerical evaluation on first-principles phonon dispersions and scattering rates rather than by fitting a parameter or re-expressing one quantity in terms of the other. The physical interpretation linking large ratios to collective drift is presented as an observed outcome of the calculations, not as a definitional equivalence or self-referential construction. No load-bearing step reduces to a self-citation chain, an ansatz smuggled via prior work, or a fitted input renamed as a prediction. The result remains self-contained against external benchmarks of the two transport approximations.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The work rests on standard phonon transport theory without introducing new free parameters or postulated entities; the indicator is simply a ratio of two existing computational approaches.

axioms (2)

domain assumption The linearized Peierls-Boltzmann equation provides an accurate reference solution for phonon transport in the materials considered.
Invoked when the full LPBE solution is taken as the benchmark against which the RTA ratio is evaluated.
domain assumption The relaxation time approximation supplies a reliable baseline for predominantly diffusive phonon transport.
Used to define the denominator of the proposed indicator ratio.

pith-pipeline@v0.9.0 · 5862 in / 1513 out tokens · 57477 ms · 2026-05-20T09:56:47.976767+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

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Relation between the paper passage and the cited Recognition theorem.

the ratio of thermal conductivity (κ) obtained from the complete solution of the linearized Peierls-Boltzmann equation (LPBE) ... to that from the relaxation time approximation (RTA) ... is a low cost indicator for phonon hydrodynamics
IndisputableMonolith/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

?

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

collectively drifting non-equilibrium phonons amplify the ratio of κ_LPBE to κ_RTA

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.
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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

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[1] [1]

1 is solved forf λ using iterative solvers [20, 21], which have become computa- tionally inexpensive in recent years due to the improve- ments in computing hardware and algorithms

OnceΩis computed, Eq. 1 is solved forf λ using iterative solvers [20, 21], which have become computa- tionally inexpensive in recent years due to the improve- ments in computing hardware and algorithms. Fromf λ, we obtain the heat fluxJ= 1 V P λ ℏωλvλfλ for a crys- tal volumeV, and cast it into a linear response relation: J=−κ LP BE∇Tto obtainκ LP BE. In ...

work page 2022

[2] [2]

R. A. Guyer and J. A. Krumhansl, Thermal Conductiv- ity, Second Sound, and Phonon Hydrodynamic Phenom- ena in Nonmetallic Crystals, Physical Review148, 778 (1966)

work page 1966

[3] [3]

R. J. Hardy, Phonon Boltzmann Equation and Second Sound in Solids, Physical Review B2, 1193 (1970)

work page 1970

[4] [4]

S. Lee, D. Broido, K. Esfarjani, and G. Chen, Hydrody- namic phonon transport in suspended graphene, Nature Communications6, 6290 (2015)

work page 2015

[5] [5]

Cepellotti, G

A. Cepellotti, G. Fugallo, L. Paulatto, M. Lazzeri, F. Mauri, and N. Marzari, Phonon hydrodynamics in two-dimensional materials, Nature Communications6, 6400 (2015)

work page 2015

[6] [6]

Simoncelli, N

M. Simoncelli, N. Marzari, and A. Cepellotti, General- ization of Fourier’s Law into Viscous Heat Equations, Physical Review X10, 011019 (2020)

work page 2020

[7] [7]

Huang, R

X. Huang, R. Anufriev, L. Jalabert, K. Watanabe, T. Taniguchi, Y. Guo, Y. Ni, S. Volz, and M. Nomura, A graphite thermal Tesla valve driven by hydrodynamic phonon transport, Nature634, 1086 (2024)

work page 2024

[8] [8]

Shi, Nonresistive heat transport by collective phonon flow, Science364, 332 (2019)

L. Shi, Nonresistive heat transport by collective phonon flow, Science364, 332 (2019)

work page 2019

[9] [9]

Chen, Non-Fourier phonon heat conduction at the mi- croscale and nanoscale, Nature Reviews Physics3, 555 (2021)

G. Chen, Non-Fourier phonon heat conduction at the mi- croscale and nanoscale, Nature Reviews Physics3, 555 (2021)

work page 2021

[10] [10]

H. E. Jackson, C. T. Walker, and T. F. McNelly, Second Sound in NaF, Physical Review Letters25, 26 (1970)

work page 1970

[11] [11]

H. E. Jackson and C. T. Walker, Thermal Conductivity, Second Sound, and Phonon-Phonon Interactions in NaF, Physical Review B3, 1428 (1971)

work page 1971

[12] [12]

Narayanamurti and R

V. Narayanamurti and R. C. Dynes, Observation of sec- ond sound in bismuth, Physical Review Letters28, 1461 (1972)

work page 1972

[13] [13]

Kawabata, K

T. Kawabata, K. Shimura, Y. Ishii, M. Koike, K. Yoshida, S. Yonehara, K. Yokoi, A. Subedi, K. Behnia, and Y. Machida, Phonon hydrodynamic regimes in sap- phire, Physical Review Research7, 033017 (2025)

work page 2025

[14] [14]

Beardo, M

A. Beardo, M. L´ opez-Su´ arez, L. A. P´ erez, L. Sendra, M. I. Alonso, C. Melis, J. Bafaluy, J. Camacho, L. Colombo, R. Rurali, F. X. Alvarez, and J. S. Reparaz, Observation of second sound in a rapidly varying temper- ature field in Ge, Science Advances7, eabg4677 (2021)

work page 2021

[15] [15]

Huberman, R

S. Huberman, R. A. Duncan, K. Chen, B. Song, V. Chiloyan, Z. Ding, A. A. Maznev, G. Chen, and K. A. Nelson, Observation of second sound in graphite at tem- peratures above 100 K, Science364, 375 (2019)

work page 2019

[16] [16]

Z. Ding, K. Chen, B. Song, J. Shin, A. A. Maznev, K. A. Nelson, and G. Chen, Observation of second sound in graphite over 200 K, Nature Communications13, 285 (2022)

work page 2022

[17] [17]

Z. Xie, Y. Zhang, X. Huang, Z. Ding, J. Wei, D. Dong, K. Cao, T. Lai, K. Watanabe, T. Taniguchi, X. Qian, M. Nomura, and K. Chen, Room-temperature second sound in isotopically pure graphite, Nature Communi- 6 cations 10.1038/s41467-026-70807-3 (2026)

work page doi:10.1038/s41467-026-70807-3 2026

[18] [18]

N. K. Ravichandran and D. Broido, Unified first- principles theory of thermal properties of insulators, Physical Review B98, 085205 (2018)

work page 2018

[19] [19]

N. K. Ravichandran and D. Broido, Phonon-phonon in- teractions in strongly bonded solids: selection rules and higher-order processes, Physical Review X10, 021063 (2020)

work page 2020

[20] [20]

N. K. Ravichandran, Elasticity reshapes heat flow in graphene (2026), arXiv:2604.03910 [cond-mat]

work page internal anchor Pith review Pith/arXiv arXiv 2026

[21] [21]

D. A. Broido, M. Malorny, G. Birner, N. Mingo, and D. A. Stewart, Intrinsic lattice thermal conductivity of semiconductors from first principles, Applied Physics Letters91, 231922 (2007)

work page 2007

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