Equilibrium state of a Fermi system in the diffusion approximation of kinetic theory

Sergiy V. Lukyanov

arxiv: 2606.06321 · v1 · pith:5YSE666Wnew · submitted 2026-06-04 · ⚛️ nucl-th

Equilibrium state of a Fermi system in the diffusion approximation of kinetic theory

Sergiy V. Lukyanov This is my paper

Pith reviewed 2026-06-27 23:10 UTC · model grok-4.3

classification ⚛️ nucl-th

keywords diffusion equationFermi systemkinetic theoryequilibrium temperatureenergy spacemomentum spacenuclear relaxationdistribution function

0 comments

The pith

A consistent mapping of the diffusion equation from momentum to energy space shows equivalent temperature definitions but yields energy-dependent equilibrium temperature when kinetic coefficients vary with energy.

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

The paper transforms the diffusion equation of kinetic theory for a Fermi system from momentum space to energy space while explicitly conserving particle number. With the assumption of constant single-particle level density, the transformed equation becomes a one-dimensional diffusion equation in energy space equipped with consistent kinetic coefficients. The equivalence of the equilibrium temperature defined in momentum space versus energy space follows directly from the stationary solution. When the kinetic coefficients are allowed to depend on energy, the equilibrium temperature itself becomes energy-dependent and the distribution function is modified accordingly. The results are intended for analyzing relaxation in atomic nuclei and nonequilibrium Fermi-system dynamics.

Core claim

The central claim is that a consistent transformation from the momentum-space diffusion equation to energy space preserves particle-number conservation. Under constant level density the equation reduces to a one-dimensional diffusion problem in energy space. The stationary solution demonstrates that the temperature definition is equivalent in both spaces. Allowing the kinetic coefficients to depend on energy produces an energy-dependent equilibrium temperature and a corresponding modification of the distribution function.

What carries the argument

The consistent transformation of the diffusion equation from momentum space to energy space that preserves particle-number conservation.

If this is right

The equilibrium temperature remains unambiguously defined whether the diffusion equation is written in momentum or energy variables.
Energy dependence of the kinetic coefficients produces an equilibrium temperature that itself varies with energy.
The equilibrium distribution function acquires a modified form once kinetic coefficients depend on energy.
Relaxation processes in atomic nuclei can be described by the resulting one-dimensional energy-space diffusion equation.

Where Pith is reading between the lines

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

The same transformation technique could be applied to systems with slowly varying level density to obtain approximate energy-dependent temperatures.
The modified distribution may alter predicted spectra or yields in nuclear collision simulations that assume a standard Fermi-Dirac form.
Similar consistency requirements on temperature definitions might appear in other transport approximations used for quantum many-body systems.

Load-bearing premise

The single-particle level density is independent of energy.

What would settle it

A stationary solution computed directly in momentum space that yields a different temperature from the energy-space solution under the same kinetic coefficients would falsify the claimed equivalence.

Figures

Figures reproduced from arXiv: 2606.06321 by Sergiy V. Lukyanov.

**Figure 1.** Figure 1: Dependence of the diffusion coefficient D(ǫ) on the relative energy ǫ/ǫF for the Heaviside step distribution, Eq. (45) (T = 0), and the Fermi distribution, Eq. (28), at T = 4 and 8 MeV. With increasing temperature T, the equilibrium Fermi distribution becomes more diffuse. Under particle-number conservation, this leads to a decrease of ǫF compared to the step-like distribution (45). For the density ρ = 0.1… view at source ↗

**Figure 2.** Figure 2: Dependence of the drift coefficient v(ǫ) on the relative energy ǫ/ǫF . The calculation parameters and curve labels are the same as in [PITH_FULL_IMAGE:figures/full_fig_p014_2.png] view at source ↗

**Figure 3.** Figure 3: Dependence of the first moment A(ǫ) on the relative energy ǫ/ǫF . The calculation parameters and curve labels are the same as in [PITH_FULL_IMAGE:figures/full_fig_p016_3.png] view at source ↗

**Figure 4.** Figure 4: Dependence of the equilibrium temperature [PITH_FULL_IMAGE:figures/full_fig_p018_4.png] view at source ↗

**Figure 5.** Figure 5: Relative difference ∆Teq/Teq as a function of the relative energy ǫ/ǫF . The calculation parameters and curve labels are the same as in [PITH_FULL_IMAGE:figures/full_fig_p019_5.png] view at source ↗

**Figure 6.** Figure 6: Dependence of the equilibrium distribution functio [PITH_FULL_IMAGE:figures/full_fig_p020_6.png] view at source ↗

read the original abstract

A consistent transformation from momentum space to energy space is performed for the diffusion equation within kinetic theory, with particle-number conservation explicitly preserved. Under the assumption of a constant single-particle level density, the equation reduces to a one-dimensional diffusion equation in energy space with consistent kinetic coefficients. The equivalence of the definitions of the equilibrium temperature in momentum space and in energy space is demonstrated. It is established that the inclusion of the energy dependence of the kinetic coefficients leads to an energy-dependent equilibrium temperature and a modification of the distribution function. The obtained results may be used to analyze relaxation processes in atomic nuclei and nonequilibrium dynamics of Fermi systems.

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 paper performs a momentum-to-energy transformation of the diffusion equation for Fermi systems that preserves particle number and shows temperature equivalence under constant level density, plus an energy-dependent temperature when coefficients vary with energy.

read the letter

The main result here is a consistent change of variables from momentum to energy space for the diffusion equation in kinetic theory, keeping particle number explicit. Under the constant single-particle level density assumption it collapses to a one-dimensional diffusion equation in energy with matching kinetic coefficients. The work also shows that the equilibrium temperature definitions match between the two spaces and that letting the coefficients depend on energy produces an energy-dependent temperature plus a changed distribution function.

What stands out is the care taken with the transformation itself and the particle-number constraint. That step looks technically sound on the face of it and could be useful for people who already model relaxation in nuclei or other Fermi systems with diffusion approximations.

The soft spots are straightforward. Everything rests on the constant level-density assumption, which is stated but not relaxed or tested. The abstract gives no derivations, error bounds, or numerical checks, so it is impossible to judge whether the algebra holds without hidden inconsistencies or whether the energy-dependent case is handled rigorously. There are also no citations, which makes it hard to tell how much of the transformation or the temperature result is actually new versus a re-derivation.

This is a narrow technical note aimed at specialists already working inside the diffusion approximation for nuclear or Fermi-system kinetics. A reader who needs that specific mapping might find the algebra helpful, but the paper does not open new questions or provide evidence that would change broader modeling practice.

If the full derivations in the manuscript are clean and the assumptions are clearly flagged, it is worth sending to peer review for the technical community to check. Otherwise it stays a limited exercise.

Referee Report

0 major / 3 minor

Summary. The manuscript performs a consistent transformation of the diffusion equation from momentum space to energy space for a Fermi system in the diffusion approximation of kinetic theory, with explicit preservation of particle number. Under the assumption of constant single-particle level density, the equation reduces to a one-dimensional diffusion equation in energy space with consistent kinetic coefficients. It demonstrates equivalence of the equilibrium temperature definitions in momentum and energy spaces, and shows that energy-dependent kinetic coefficients lead to an energy-dependent equilibrium temperature and a modified distribution function. The results are positioned for application to relaxation processes in atomic nuclei and nonequilibrium Fermi dynamics.

Significance. If the central derivations hold, the work supplies a technically consistent route to energy-space formulations of the diffusion approximation while preserving key conservation laws and thermodynamic consistency (temperature equivalence). This could facilitate modeling of nuclear relaxation and nonequilibrium evolution where energy-space treatments are preferred, particularly when kinetic coefficients vary with energy.

minor comments (3)

The abstract states that the transformation 'explicitly preserves' particle number, but the manuscript should include an explicit verification step (e.g., integration over the transformed distribution) to confirm this holds after the change of variables.
The reduction to the one-dimensional energy-space diffusion equation is stated to occur under the constant level-density assumption; a brief remark on the magnitude of corrections when level density varies slowly would strengthen the applicability discussion.
The claim that energy-dependent kinetic coefficients produce an energy-dependent temperature is presented as a derived result; the manuscript should clarify whether this follows directly from the transformed Fokker-Planck operator or requires an additional closure.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive summary, significance assessment, and recommendation of minor revision. No specific major comments were raised in the provided report.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper performs an explicit transformation from momentum-space diffusion equation to energy space while enforcing particle-number conservation, then invokes an explicit assumption of constant single-particle level density to reduce to a 1D energy diffusion equation. The claimed equivalence of equilibrium-temperature definitions is presented as a derived result under that assumption, and the effect of energy-dependent kinetic coefficients is stated as a separate consequence. No step reduces by construction to a fitted parameter, self-citation, or redefinition of the target quantity; all load-bearing steps are conditional on stated assumptions and are not shown to be equivalent to their own inputs. The derivation chain is therefore self-contained against external benchmarks.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The central claim rests on the diffusion approximation of kinetic theory (standard in the field) and the explicit assumption of constant single-particle level density; no free parameters or new entities are introduced in the abstract.

axioms (2)

domain assumption Constant single-particle level density
Invoked to reduce the transformed equation to one-dimensional diffusion in energy space.
domain assumption Diffusion approximation of kinetic theory
Starting point of the entire derivation; not derived in the abstract.

pith-pipeline@v0.9.1-grok · 5623 in / 1265 out tokens · 21103 ms · 2026-06-27T23:10:41.329980+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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Particular attention has been devoted to the equivalence between the descriptions in momentum and energy space

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Shlomo and V

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S. V. Lukyanov, Properties of the diﬀusion and drift kine tic coeﬃcients in momentum space for a cold Fermi system, Nucl. Phys. and At. Energy 24, 5 (2023) , arXiv:2210.15299 [nucl-th]

arXiv 2023
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arXiv 2026
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Shi and P

L. Shi and P. Danielewicz, Nuclear isospin diﬀusivity, Phys. Rev. C 68, 064604 (2003) , arXiv:0304030 [nucl-th]

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[25]

D. D. S. Coupland, W. G. Lynch, M. B. Tsang, P. Danielewic z, and Y. Zhang, In- ﬂuence of transport variables on isospin transport ratios, Phys. Rev. C 84, 054603 (2011) , arXiv:1107.3709 [nucl-th]

Pith/arXiv arXiv 2011
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D. Ravenhall, C. Pethick, and J. Lattimer, Nuclear inte rface energy at ﬁnite temperatures, Nucl. Phys. A 407, 571 (1983)

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arXiv 2021
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S. V. Lukyanov, Properties of the kinetic diﬀusion and dr ift coeﬃcients in momentum space for a ﬁnite-size fermi system, in Abstr. XXX Ann. Sci. Conf. Inst. Nucl. Res. NASU (2023) pp. 27–28. 24

2023

[1] [1]

Particular attention has been devoted to the equivalence between the descriptions in momentum and energy space

and ( 23). Particular attention has been devoted to the equivalence between the descriptions in momentum and energy space. At ﬁrst sight, diﬀerent deﬁnitions of the kinetic coeﬃcients 20 may suggest an apparent ambiguity, in particular in the deﬁnition of t he equilibrium tem- perature Teq through the ratio of diﬀusion and drift coeﬃcients. It has been sh...

[2] [2]

V. M. Kolomietz and S. Shlomo, Mean Field Theory (World Scientiﬁc, Singapore, 2020)

2020

[3] [3]

E. M. Lifshitz and L. P. Pitaevskii, Physical kinetics (Pergamon Press, Oxford, 1981) Chap. 2

1981

[4] [4]

Risken, The Fokker–Planck Equation: Methods of Solution and Applica tions, 2nd ed., Springer Series in Synergetics, Vol

H. Risken, The Fokker–Planck Equation: Methods of Solution and Applica tions, 2nd ed., Springer Series in Synergetics, Vol. 18 (Springer, Berlin, 1989)

1989

[5] [5]

Chomaz, M

P. Chomaz, M. Colonna, and J. Randrup, Nuclear spinodal f ragmentation, Phys. Rep. 389, 263 (2004)

2004

[6] [6]

V. M. Kolomietz and S. V. Lukyanov, Diﬀusion on the distort ed Fermi surface, Ukr. J. Phys. 59, 764 (2014) , arXiv:1409.1391 [nucl-th]

Pith/arXiv arXiv 2014

[7] [7]

V. M. Kolomietz and S. V. Lukyanov, Diﬀuse approximation t o the kinetic theory in a Fermi system, Int. Journ. Mod. Phys. E 24, 1550023 (2015) , arXiv:1504.00216 [nucl-th]

Pith/arXiv arXiv 2015

[8] [8]

N¨ orenberg, Transport phenomena in multi-nucleon tr ansfer reactions, Phys

W. N¨ orenberg, Transport phenomena in multi-nucleon tr ansfer reactions, Phys. Lett. B 52, 289 (1974)

1974

[9] [9]

Ayik and W

S. Ayik and W. N¨ orenberg, Transport theory of deeply ine lastic heavy-ion collisions: II. Microscopic derivation of friction and diﬀusion coeﬃcients , Z. Phys. A 297, 55 (1980)

1980

[10] [10]

W. U. Schr¨ oder and J. R. Huizenga, Damped nuclear reacti ons, Treatise on Heavy-Ion Science 2, 113 (1984)

1984

[11] [11]

Hilscher and H

D. Hilscher and H. Rossner, Dynamics of nuclear ﬁssion, Ann. Phys. Fr. 17, 471 (1992)

1992

[12] [12]

G. F. Bertsch and S. Das Gupta, A guide to microscopic mod els for intermediate-energy heavy ion collisions, Phys. Rept. 160, 189 (1988)

1988

[13] [13]

Fr¨ obrich and R

P. Fr¨ obrich and R. Lipperheide, Theory of Nuclear Reactions , Oxford Studies in Nuclear Physics (Clarendon Press, Oxford, 1996)

1996

[14] [14]

Hofmann, The Physics of Warm Nuclei: With Applications to Fission and H eavy-Ion Collisions (Oxford University Press, 2008)

H. Hofmann, The Physics of Warm Nuclei: With Applications to Fission and H eavy-Ion Collisions (Oxford University Press, 2008)

2008

[15] [15]

Wolschin, Equilibration in ﬁnite fermion systems, Phys

G. Wolschin, Equilibration in ﬁnite fermion systems, Phys. Rev. Lett. 48, 1004 (1982) . 23

1982

[16] [16]

Bartsch and G

T. Bartsch and G. Wolschin, Equilibration in fermionic systems, Ann. Phys. 400, 21 (2019) , arXiv:1806.04044 [cond-mat.stat-mech]

Pith/arXiv arXiv 2019

[17] [17]

Shlomo, The level density parameter in a nucleus, Nucl

S. Shlomo, The level density parameter in a nucleus, Nucl. Phys. A 539, 17 (1992)

1992

[18] [18]

Shlomo and V

S. Shlomo and V. M. Kolomietz, Relaxation of collective excitations in quantum Fermi liquids, Phys. Rev. C 70, 014308 (2004)

2004

[19] [19]

Shlomo and V

S. Shlomo and V. M. Kolomietz, Lectures on Statistical Physics of Nuclei (World Scientiﬁc, Singapore, 2005)

2005

[20] [20]

S. V. Lukyanov, Properties of the diﬀusion and drift kine tic coeﬃcients in momentum space for a cold Fermi system, Nucl. Phys. and At. Energy 24, 5 (2023) , arXiv:2210.15299 [nucl-th]

arXiv 2023

[21] [21]

S. V. Lukyanov, Relaxation of a single-particle excita tion in a fermi system within the diﬀusion approximation of kinetic theory, Phys. Rev. C 113, 034312 (2026) , arXiv:2511.19689 [nucl-th]

arXiv 2026

[22] [22]

A. S. Davydov, Quantum Mechanics (Pergamon Press, Oxford, New York, 1965)

1965

[23] [23]

V. M. Kolomietz, V. A. Plujko, and S. Shlomo, Interplay b etween one-body and collisional damping of collective motion in nuclei, Phys. Rev. C 54, 3014 (1996)

1996

[24] [24]

Shi and P

L. Shi and P. Danielewicz, Nuclear isospin diﬀusivity, Phys. Rev. C 68, 064604 (2003) , arXiv:0304030 [nucl-th]

2003

[25] [25]

D. D. S. Coupland, W. G. Lynch, M. B. Tsang, P. Danielewic z, and Y. Zhang, In- ﬂuence of transport variables on isospin transport ratios, Phys. Rev. C 84, 054603 (2011) , arXiv:1107.3709 [nucl-th]

Pith/arXiv arXiv 2011

[26] [26]

Ravenhall, C

D. Ravenhall, C. Pethick, and J. Lattimer, Nuclear inte rface energy at ﬁnite temperatures, Nucl. Phys. A 407, 571 (1983)

1983

[27] [27]

S. V. Lukyanov, Diﬀuse relaxation approximation in a hea ted Fermi system, Int. Journ. Mod. Phys. E 30, 2150060 (2021) , arXiv:2103.17129 [nucl-th]

arXiv 2021

[28] [28]

S. V. Lukyanov, Properties of the kinetic diﬀusion and dr ift coeﬃcients in momentum space for a ﬁnite-size fermi system, in Abstr. XXX Ann. Sci. Conf. Inst. Nucl. Res. NASU (2023) pp. 27–28. 24

2023