Nonlinear Kinetic Diffusion Equations with $p$-Growth

Helge Dietert (IMJ-PRG (UMR\_7586)); Lukas Niebel (FB 10); Rico Zacher

arxiv: 2605.18521 · v1 · pith:BR4232KFnew · submitted 2026-05-18 · 🧮 math.AP

Nonlinear Kinetic Diffusion Equations with p-Growth

Helge Dietert (IMJ-PRG (UMR\_7586)) , Lukas Niebel (FB 10) , Rico Zacher This is my paper

Pith reviewed 2026-05-20 08:44 UTC · model grok-4.3

classification 🧮 math.AP

keywords local boundednesskinetic diffusionp-growthGagliardo-Nirenberg inequalitiessubsolutionsnonlinear PDEtransport and diffusion

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The pith

Solutions to nonlinear kinetic diffusion equations with p-growth are locally bounded

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

The paper proves local boundedness for subsolutions of nonlinear kinetic diffusion equations that satisfy a p-growth condition on the diffusion term. The kinetic p-Laplace equation appears as the main example. A sympathetic reader cares because local boundedness rules out finite-time blow-up in local regions, which is a necessary step before questions of global existence or long-time behavior can be addressed in models that combine transport with nonlinear diffusion. The proof proceeds by first deriving kinetic Gagliardo-Nirenberg inequalities that bound an L^q norm of the solution using separate controls on the transport direction in one Lebesgue space and the diffusive direction in another.

Core claim

We establish the local boundedness of (sub-)solutions to nonlinear kinetic diffusion equations with p-growth, where the kinetic p-Laplace equation is a prototypical example. A key ingredient is the derivation of kinetic Gagliardo-Nirenberg inequalities, where the Lebesgue norm of a function is estimated in terms of its transport and diffusive directions controlled in different Lebesgue spaces.

What carries the argument

Kinetic Gagliardo-Nirenberg inequalities that estimate the Lebesgue norm of a function by controlling its transport derivative in one Lebesgue space and its diffusive derivative in another.

If this is right

Local boundedness holds for the kinetic p-Laplace equation.
The same conclusion applies to the broader class of nonlinear kinetic diffusion equations with p-growth.
The new inequalities supply a tool for regularity theory in kinetic settings that separate transport and diffusion.

Where Pith is reading between the lines

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

The separation of transport and diffusion controls may extend to other mixed-derivative kinetic equations beyond p-growth.
These boundedness results could serve as a starting point for proving global existence or uniqueness in applied kinetic models.
Numerical tests on explicit solutions for small p could check whether the predicted local bounds are sharp.

Load-bearing premise

The kinetic Gagliardo-Nirenberg inequalities hold with the stated control on transport and diffusive directions in different Lebesgue spaces.

What would settle it

A concrete subsolution to the kinetic p-Laplace equation that becomes unbounded inside some open space-time region would show the local boundedness claim is false.

read the original abstract

We establish the local boundedness of (sub-)solutions to nonlinear kinetic diffusion equations with $p$-growth, where the kinetic p-Laplace equation is a prototypical example. A key ingredient is the derivation of kinetic Gagliardo-Nirenberg inequalities, where the Lebesgue norm of a function is estimated in terms of its transport and diffusive directions controlled in different Lebesgue spaces.

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's main contribution is a set of kinetic Gagliardo-Nirenberg inequalities that split control between transport and diffusive directions to prove local boundedness for nonlinear kinetic diffusion equations with p-growth.

read the letter

The key point is that they adapt Gagliardo-Nirenberg to the kinetic setting by estimating an L^q norm through a product of a transport norm in one space and a diffusive norm in another, then use this to get local boundedness for subsolutions, with the kinetic p-Laplace as the main example. This split in directions looks like the genuinely new piece relative to the classical inequalities they cite. It gives a cleaner way to organize boundedness arguments when transport and diffusion act in different variables or with different strengths. The boundedness result itself follows the usual De Giorgi or Moser pattern once the inequality is in hand, so the value sits in the tool rather than in a surprising conclusion. The stress-test concern about a priori regularity is worth checking: if the inequality proof uses integration by parts or test functions that weak subsolutions do not yet justify, an approximation step would be needed to avoid circularity. The abstract does not make that step explicit, so the full write-up needs to show the inequalities apply directly or via a structure-preserving mollification. This work sits in the regularity theory for kinetic and degenerate parabolic equations. Readers who already care about boundedness in transport-diffusion systems or who need interpolation tools with directional control will get the most out of it. The technical novelty and the absence of obvious contradictions make it worth sending to a serious referee who can verify the inequality derivations and their application to the weak formulation.

Referee Report

1 major / 1 minor

Summary. The manuscript establishes the local boundedness of (sub-)solutions to nonlinear kinetic diffusion equations with p-growth, taking the kinetic p-Laplace equation as a prototypical example. The central technical step is the derivation of kinetic Gagliardo-Nirenberg inequalities that bound an L^q norm of a function by a product of a transport norm in one Lebesgue space and a diffusive norm in another.

Significance. If the kinetic Gagliardo-Nirenberg inequalities apply rigorously to weak subsolutions, the result would extend classical local boundedness techniques from parabolic to kinetic settings and supply a useful tool for regularity theory in nonlinear kinetic diffusion equations.

major comments (1)

[Derivation of kinetic Gagliardo-Nirenberg inequalities] The derivation of the kinetic Gagliardo-Nirenberg inequalities (the key ingredient highlighted in the abstract) relies on interpolation or Fourier-analytic steps whose justification for weak subsolutions is not fully detailed. It is unclear whether these steps presuppose higher integrability or differentiability than is available from the weak formulation of the nonlinear kinetic diffusion equation; without an explicit mollification or approximation argument that preserves the kinetic structure, the direct application to obtain boundedness risks circularity.

minor comments (1)

Clarify the precise function spaces in which the transport and diffusive directions are controlled, and ensure the p-growth condition is stated uniformly in the introduction and main theorems.

Simulated Author's Rebuttal

1 responses · 0 unresolved

We thank the referee for the careful reading of our manuscript and for highlighting the need for greater clarity on the justification of the kinetic Gagliardo-Nirenberg inequalities. We address this point below and will revise the manuscript accordingly.

read point-by-point responses

Referee: The derivation of the kinetic Gagliardo-Nirenberg inequalities (the key ingredient highlighted in the abstract) relies on interpolation or Fourier-analytic steps whose justification for weak subsolutions is not fully detailed. It is unclear whether these steps presuppose higher integrability or differentiability than is available from the weak formulation of the nonlinear kinetic diffusion equation; without an explicit mollification or approximation argument that preserves the kinetic structure, the direct application to obtain boundedness risks circularity.

Authors: We agree that an explicit approximation argument is necessary to rigorously justify the application of the kinetic Gagliardo-Nirenberg inequalities to weak subsolutions. The inequalities themselves are first derived for smooth test functions via standard interpolation between the transport norm (in one Lebesgue space) and the diffusive norm (in another), using Fourier-analytic techniques only on the regularized level. The weak formulation of the nonlinear kinetic diffusion equation directly yields the integrability required for these norms without assuming additional differentiability. To eliminate any risk of circularity, we will insert a dedicated subsection detailing a mollification procedure that preserves the kinetic structure (transport in the velocity variable and diffusion in the spatial variable) and passes to the limit in the weak sense. This clarification will be added in the revised version. revision: yes

Circularity Check

0 steps flagged

Derivation of kinetic G-N inequalities is independent of the boundedness result

full rationale

The paper's central claim is the local boundedness of weak subsolutions to nonlinear kinetic diffusion equations with p-growth, obtained via newly derived kinetic Gagliardo-Nirenberg inequalities that control an L^q norm by transport and diffusive norms in different Lebesgue spaces. These inequalities are presented as a key ingredient derived within the paper (likely via interpolation or analysis in kinetic variables), rather than by fitting parameters to the target result or by self-referential definition. No load-bearing step reduces by construction to the boundedness conclusion itself, and the application to subsolutions does not presuppose higher regularity in a way that creates a definitional loop. Self-citations, if present, are not required to justify uniqueness or to force the main theorem. The derivation chain remains self-contained against external benchmarks.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The result relies on standard Sobolev-type embeddings and interpolation inequalities adapted to the kinetic setting; no free parameters or invented entities are introduced.

axioms (1)

standard math Standard functional analysis tools such as Gagliardo-Nirenberg interpolation hold in the kinetic variables.
Invoked to derive the kinetic version of the inequalities.

pith-pipeline@v0.9.0 · 5592 in / 1049 out tokens · 36261 ms · 2026-05-20T08:44:02.804736+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

?

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

Theorem 1.2 ... kinetic Gagliardo–Nirenberg inequalities ... 1/q := 1/(4d+2) (3d+1/p + d+1/μ −1)
IndisputableMonolith/Foundation/AlexanderDuality.lean alexander_duality_circle_linking unclear

?

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

kinetic trajectories γ_m(r) with g1(r)=r^β sin(log r), g2(r)=r^β cos(log r)

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.
uses: The paper appears to rely on the theorem as machinery.
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

Works this paper leans on

18 extracted references · 18 canonical work pages

[1]

Poincar´ e inequality and quantitative de giorgi m ethod for hypoelliptic operators, 2025

Francesca Anceschi, Helge Dietert, Jessica Guerand, Am ´ elie Loher, Cl´ ement Mouhot, and Annalaura Rebucci. Poincar´ e inequality and quantitative de giorgi m ethod for hypoelliptic operators, 2025. arXiv:2401.12194

work page arXiv 2025
[2]

Boundedness es timates for nonlinear nonlocal kinetic Kolmogorov-Fokker-Planck equations

Francesca Anceschi and Mirco Piccinini. Boundedness es timates for nonlinear nonlocal kinetic Kolmogorov-Fokker-Planck equations. NoDEA Nonlinear Diﬀerential Equations Appl. , 32(6):Paper No. 121, 25, 2025

work page 2025
[3]

Weak sol utions to Kolmogorov-Fokker-Planck equations: regularity, existence and uniqueness, 2024

Pascal Auscher, Cyril Imbert, and Lukas Niebel. Weak sol utions to Kolmogorov-Fokker-Planck equations: regularity, existence and uniqueness, 2024. arXiv:2403.1 7464

work page 2024
[4]

Kinetic Sobolev Spaces, 2026

Pascal Auscher and Lukas Niebel. Kinetic Sobolev spaces , 2026. arXiv:2603.17491

work page arXiv 2026
[5]

Degenerate parabolic equations

Emmanuele DiBenedetto. Degenerate parabolic equations. Universitext. New York, NY: Springer-Verlag, 1993

work page 1993
[6]

Dieter, J

Helge Dietert and Jonas Hirsch. Regularity for rough hyp oelliptic equations, 2022. arXiv:2209.08077

work page arXiv 2022
[7]

Critical trajectories in kinetic geometry,

Helge Dietert, Cl´ ement Mouhot, Lukas Niebel, and Rico Z acher. Critical trajectories in kinetic geometry,

work page
[8]

Nash’sGbound for the Kolmogorov equation, 2025

Helge Dietert and Lukas Niebel. Nash’s G bound for the Kolmogorov equation, 2025. arXiv:2510.21621

work page arXiv 2025
[9]

On regularity and exi stence of weak solutions to nonlinear Kolmogorov-Fokker-Planck type equations with rough coeﬃc ients

Prashanta Garain and Kaj Nystr¨ om. On regularity and exi stence of weak solutions to nonlinear Kolmogorov-Fokker-Planck type equations with rough coeﬃc ients. Math. Eng. , 5(2):Paper No. 043, 37, 2023

work page 2023
[10]

Harnack inequality for kinetic Fokker- Planck equations with rough coeﬃcients and application to t he Landau equation

Fran¸ cois Golse, Cyril Imbert, Cl´ ement Mouhot, and Alexis Vasseur. Harnack inequality for kinetic Fokker- Planck equations with rough coeﬃcients and application to t he Landau equation. Ann. Sc. Norm. Super. Pisa, Cl. Sci. (5) , 19(1):253–295, 2019

work page 2019
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Classical Fourier analysis , volume 249 of Graduate Texts in Mathematics

Loukas Grafakos. Classical Fourier analysis , volume 249 of Graduate Texts in Mathematics . Springer, New York, second edition, 2008

work page 2008
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Quantitative De Giorgi methods in kinetic theory

Jessica Guerand and Cl´ ement Mouhot. Quantitative De Giorgi methods in kinetic theory. J. ´Ec. polytech. Math., 9:1159–1181, 2022

work page 2022
[13]

Hypoelliptic second order diﬀerenti al equations

Lars H¨ ormander. Hypoelliptic second order diﬀerenti al equations. Acta Math. , 119:147–171, 1967

work page 1967
[14]

Obstacle problem for a class of parab olic equations of generalized p-Laplacian type

Casimir Lindfors. Obstacle problem for a class of parab olic equations of generalized p-Laplacian type. J. Diﬀer. Equations , 261(10):5499–5540, 2016

work page 2016
[15]

On a kinetic Poincar´ e inequality and beyond

Lukas Niebel and Rico Zacher. On a kinetic Poincar´ e inequality and beyond. J. Funct. Anal., 289(1):Paper No. 110899, 18, 2025

work page 2025
[16]

The Moser’s itera tive method for a class of ultraparabolic equations

Andrea Pascucci and Sergio Polidoro. The Moser’s itera tive method for a class of ultraparabolic equations. Commun. Contemp. Math. , 6(3):395–417, 2004

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[17]

The method of intrinsic scaling

Jos´ e Miguel Urbano. The method of intrinsic scaling. A systematic approach to re gularity for degenerate and singular PDEs , volume 1930 of Lect. Notes Math. Berlin: Springer, 2008

work page 1930
[18]

The C α regularity of weak solutions of ultraparabolic equations

Wendong Wang and Liqun Zhang. The C α regularity of weak solutions of ultraparabolic equations. Discrete Contin. Dyn. Syst. , 29(3):1261–1275, 2011. NONLINEAR KINETIC DIFFUSION EQUATIONS WITH p-GROWTH 29 (Helge Dietert) Universit´e P aris Cit´e and Sorbonne Universit ´e, CNRS, IMJ-PRG, F-75006 P aris, France Email address : helge.dietert@imj-prg.fr (Lukas...

work page 2011

[1] [1]

Poincar´ e inequality and quantitative de giorgi m ethod for hypoelliptic operators, 2025

Francesca Anceschi, Helge Dietert, Jessica Guerand, Am ´ elie Loher, Cl´ ement Mouhot, and Annalaura Rebucci. Poincar´ e inequality and quantitative de giorgi m ethod for hypoelliptic operators, 2025. arXiv:2401.12194

work page arXiv 2025

[2] [2]

Boundedness es timates for nonlinear nonlocal kinetic Kolmogorov-Fokker-Planck equations

Francesca Anceschi and Mirco Piccinini. Boundedness es timates for nonlinear nonlocal kinetic Kolmogorov-Fokker-Planck equations. NoDEA Nonlinear Diﬀerential Equations Appl. , 32(6):Paper No. 121, 25, 2025

work page 2025

[3] [3]

Weak sol utions to Kolmogorov-Fokker-Planck equations: regularity, existence and uniqueness, 2024

Pascal Auscher, Cyril Imbert, and Lukas Niebel. Weak sol utions to Kolmogorov-Fokker-Planck equations: regularity, existence and uniqueness, 2024. arXiv:2403.1 7464

work page 2024

[4] [4]

Kinetic Sobolev Spaces, 2026

Pascal Auscher and Lukas Niebel. Kinetic Sobolev spaces , 2026. arXiv:2603.17491

work page arXiv 2026

[5] [5]

Degenerate parabolic equations

Emmanuele DiBenedetto. Degenerate parabolic equations. Universitext. New York, NY: Springer-Verlag, 1993

work page 1993

[6] [6]

Dieter, J

Helge Dietert and Jonas Hirsch. Regularity for rough hyp oelliptic equations, 2022. arXiv:2209.08077

work page arXiv 2022

[7] [7]

Critical trajectories in kinetic geometry,

Helge Dietert, Cl´ ement Mouhot, Lukas Niebel, and Rico Z acher. Critical trajectories in kinetic geometry,

work page

[8] [8]

Nash’sGbound for the Kolmogorov equation, 2025

Helge Dietert and Lukas Niebel. Nash’s G bound for the Kolmogorov equation, 2025. arXiv:2510.21621

work page arXiv 2025

[9] [9]

On regularity and exi stence of weak solutions to nonlinear Kolmogorov-Fokker-Planck type equations with rough coeﬃc ients

Prashanta Garain and Kaj Nystr¨ om. On regularity and exi stence of weak solutions to nonlinear Kolmogorov-Fokker-Planck type equations with rough coeﬃc ients. Math. Eng. , 5(2):Paper No. 043, 37, 2023

work page 2023

[10] [10]

Harnack inequality for kinetic Fokker- Planck equations with rough coeﬃcients and application to t he Landau equation

Fran¸ cois Golse, Cyril Imbert, Cl´ ement Mouhot, and Alexis Vasseur. Harnack inequality for kinetic Fokker- Planck equations with rough coeﬃcients and application to t he Landau equation. Ann. Sc. Norm. Super. Pisa, Cl. Sci. (5) , 19(1):253–295, 2019

work page 2019

[11] [11]

Classical Fourier analysis , volume 249 of Graduate Texts in Mathematics

Loukas Grafakos. Classical Fourier analysis , volume 249 of Graduate Texts in Mathematics . Springer, New York, second edition, 2008

work page 2008

[12] [12]

Quantitative De Giorgi methods in kinetic theory

Jessica Guerand and Cl´ ement Mouhot. Quantitative De Giorgi methods in kinetic theory. J. ´Ec. polytech. Math., 9:1159–1181, 2022

work page 2022

[13] [13]

Hypoelliptic second order diﬀerenti al equations

Lars H¨ ormander. Hypoelliptic second order diﬀerenti al equations. Acta Math. , 119:147–171, 1967

work page 1967

[14] [14]

Obstacle problem for a class of parab olic equations of generalized p-Laplacian type

Casimir Lindfors. Obstacle problem for a class of parab olic equations of generalized p-Laplacian type. J. Diﬀer. Equations , 261(10):5499–5540, 2016

work page 2016

[15] [15]

On a kinetic Poincar´ e inequality and beyond

Lukas Niebel and Rico Zacher. On a kinetic Poincar´ e inequality and beyond. J. Funct. Anal., 289(1):Paper No. 110899, 18, 2025

work page 2025

[16] [16]

The Moser’s itera tive method for a class of ultraparabolic equations

Andrea Pascucci and Sergio Polidoro. The Moser’s itera tive method for a class of ultraparabolic equations. Commun. Contemp. Math. , 6(3):395–417, 2004

work page 2004

[17] [17]

The method of intrinsic scaling

Jos´ e Miguel Urbano. The method of intrinsic scaling. A systematic approach to re gularity for degenerate and singular PDEs , volume 1930 of Lect. Notes Math. Berlin: Springer, 2008

work page 1930

[18] [18]

The C α regularity of weak solutions of ultraparabolic equations

Wendong Wang and Liqun Zhang. The C α regularity of weak solutions of ultraparabolic equations. Discrete Contin. Dyn. Syst. , 29(3):1261–1275, 2011. NONLINEAR KINETIC DIFFUSION EQUATIONS WITH p-GROWTH 29 (Helge Dietert) Universit´e P aris Cit´e and Sorbonne Universit ´e, CNRS, IMJ-PRG, F-75006 P aris, France Email address : helge.dietert@imj-prg.fr (Lukas...

work page 2011