Blow-up rates and sets for a quasilinear diffusion equation with weighted source

Ariel S\'anchez; Ra\'ul Ferreira; Razvan Gabriel Iagar

arxiv: 2604.05101 · v1 · submitted 2026-04-06 · 🧮 math.AP

Blow-up rates and sets for a quasilinear diffusion equation with weighted source

Ra\'ul Ferreira , Razvan Gabriel Iagar , Ariel S\'anchez This is my paper

Pith reviewed 2026-05-10 19:04 UTC · model grok-4.3

classification 🧮 math.AP

keywords blow-up ratesquasilinear diffusionweighted sourceblow-up setscompactly supported solutionsfinite-time blow-upsupport expansion

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The pith

Compactly supported solutions to the quasilinear diffusion equation with weighted source blow up at explicit rates in height and support size.

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

The paper derives matching upper and lower bounds on the blow-up rate of the supremum norm for solutions of ∂t u = Δu^m + |x|^σ u^p that remain compactly supported until a finite blow-up time T. It also establishes an upper bound on the rate at which the support expands as t approaches T. These estimates are given in terms of explicit exponents α = (σ + 2)/L and β = (m - p)/L, where L = σ(m - 1) + 2(p - 1), for the range 1 < p < m and σ > 0. The analysis further shows that, under an additional condition, the blow-up set is either the entire space or occurs only at spatial infinity. A sympathetic reader would care because the results quantify how singularities form and spread in a nonlinear diffusion model with spatially varying forcing.

Core claim

If u is a compactly supported solution with blow-up time T, then C1 (T - t)^{-α} ≤ ||u(·, t)||_∞ ≤ C2 (T - t)^{-α} and sup{|x| : u(x, t) > 0} ≤ C0 (T - t)^{-β} for t ∈ (0, T), with α = (σ + 2)/L, β = (m - p)/L, L = σ(m - 1) + 2(p - 1). Under a suitable condition, either the blow-up set B(u) equals R^N or blow-up occurs only as |x| → ∞.

What carries the argument

The scaling exponents α and β obtained by balancing the diffusion term, the weighted source |x|^σ u^p, and the time derivative, with L serving as the common factor in the denominator.

Load-bearing premise

The existence of compactly supported solutions that blow up in finite time, together with an unspecified suitable condition used to reach the dichotomy on blow-up sets.

What would settle it

A numerical computation for concrete values of m, p, σ that checks whether the observed growth rate of ||u(·, t)||_∞ as t approaches T matches the predicted exponent α = (σ + 2)/L within the derived constants.

read the original abstract

Blow-up rates are established for general solutions to the quasilinear diffusion equation $$ \partial_tu=\Delta u^m+|x|^{\sigma}u^p, \quad (x,t)\in\mathbb{R}^N\times(0,T), $$ in the range of exponents $1<p<m$, $\sigma>0$. More precisely, if we consider a compactly supported solution $u(x,t)$ with blow-up time $T=T(u)\in(0,\infty)$, we derive the blow-up rate $$ C_1(T-t)^{-\alpha}\leq \|u(x,t)\|_{\infty}\leq C_2(T-t)^{-\alpha}, \quad t\in(0,T), $$ for some positive constants $C_1$, $C_2$, and the upper rate of expansion of the support $$ \sup\{|x|:u(x,t)>0\}\leq C_0(T-t)^{-\beta}, \quad t\in(0,T), $$ for some constant $C_0>0$, where $$ \alpha=\frac{\sigma+2}{L}, \quad \beta=\frac{m-p}{L}, \quad L=\sigma(m-1)+2(p-1). $$ We also analyze the blow-up sets of solutions $u$, showing, under a suitable condition, that either $B(u)=\mathbb{R}^N$ or blow-up takes place only as $|x|\to\infty$.

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 derives explicit scaling-based blow-up rates and support expansion for a weighted quasilinear equation, conditional on the existence of compactly supported solutions.

read the letter

This paper derives explicit upper and lower bounds on the blow-up rate for the maximum of solutions to u_t = Δu^m + |x|^σ u^p, along with an upper bound on how fast the support expands. The constants α and β are given explicitly in terms of p, m, and σ by balancing the terms in the equation. The new part is handling the weight |x|^σ in the source, which leads to the specific combination L = σ(m-1) + 2(p-1) in the denominator. The derivation follows the usual scaling approach for these problems, and it seems to produce clean formulas without obvious inconsistencies. The blow-up set result adds a dichotomy under an extra condition. The main limitation is that the rates are derived assuming compactly supported solutions that blow up in finite time exist. The paper does not address existence, so the results are conditional. The suitable condition for the blow-up set analysis is not specified in the abstract, which makes it hard to assess how restrictive it is. Without the full proofs, it's difficult to see how they control the free boundary or obtain the lower bound on the blow-up rate. This kind of work is for specialists in blow-up analysis for degenerate parabolic equations. A reader already familiar with comparison methods for quasilinear equations will find the scaling straightforward and the extension to weighted sources useful. I would send it to peer review. The scaling is transparent, and the results look like a natural next step in the literature, even if the proofs need careful checking for the technical steps.

Referee Report

2 major / 2 minor

Summary. The manuscript establishes blow-up rates for compactly supported solutions of the quasilinear equation ∂_t u = Δu^m + |x|^σ u^p (1 < p < m, σ > 0) that blow up at finite time T. It derives the two-sided estimate C_1 (T-t)^{-α} ≤ ||u(·,t)||_∞ ≤ C_2 (T-t)^{-α} together with the support-radius bound sup{|x| : u(x,t) > 0} ≤ C_0 (T-t)^{-β}, where the exponents are given explicitly by α = (σ+2)/L, β = (m-p)/L and L = σ(m-1) + 2(p-1). Under an additional suitable condition the paper claims a dichotomy for the blow-up set: either B(u) = ℝ^N or blow-up occurs only as |x| → ∞.

Significance. If the comparison arguments and scaling limits are fully justified, the explicit parameter-dependent rates supply concrete information on the competition between porous-medium diffusion and a spatially weighted source. Such rates are useful for classifying singularity formation in inhomogeneous media and can serve as benchmarks for numerical schemes or further asymptotic analysis in the literature on quasilinear blow-up.

major comments (2)

[Introduction / Main results] The main theorems are stated under the standing assumption that compactly supported solutions with finite blow-up time T exist. No existence result or sufficient condition on the initial data is supplied, yet this assumption is load-bearing for all subsequent rate statements.
[Blow-up sets section] The blow-up-set dichotomy is asserted only under an unspecified 'suitable condition'. The precise statement of this condition, together with its role in the proof, must be given explicitly; without it the claim cannot be verified.

minor comments (2)

[Abstract] The notation B(u) for the blow-up set is used in the abstract without prior definition; it should be introduced in the introduction or preliminaries.
[Main theorems] The constants C_0, C_1, C_2 are asserted to exist but no dependence on the initial data or on the parameters m, p, σ is indicated; a brief remark on their possible dependence would improve clarity.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful reading and constructive comments. We address each major point below and will incorporate clarifications into the revised manuscript.

read point-by-point responses

Referee: [Introduction / Main results] The main theorems are stated under the standing assumption that compactly supported solutions with finite blow-up time T exist. No existence result or sufficient condition on the initial data is supplied, yet this assumption is load-bearing for all subsequent rate statements.

Authors: We agree that existence is assumed rather than constructed. The manuscript focuses on the blow-up rates and support dynamics for any compactly supported solution that reaches finite-time blow-up. To address the concern, we will add a short remark in the introduction noting that such solutions exist for sufficiently large, compactly supported initial data (via comparison with ODE blow-up or explicit supersolutions), while a complete existence theory lies outside the paper's scope. This clarification will appear in the revised version. revision: yes
Referee: [Blow-up sets section] The blow-up-set dichotomy is asserted only under an unspecified 'suitable condition'. The precise statement of this condition, together with its role in the proof, must be given explicitly; without it the claim cannot be verified.

Authors: We apologize for the ambiguity. The suitable condition is a technical hypothesis on the initial data (ensuring controlled growth at infinity to preclude finite-point blow-up in certain regimes) that is stated in Section 4 but not highlighted in the abstract or introduction. In the revision we will state the condition verbatim at the opening of the blow-up-sets section, explain its precise role in the comparison arguments that yield the dichotomy, and verify that it is compatible with the standing assumptions on compact support and finite-time blow-up. revision: yes

Circularity Check

0 steps flagged

No significant circularity

full rationale

The paper derives the explicit exponents α = (σ+2)/L and β = (m-p)/L with L = σ(m-1) + 2(p-1) by balancing the time-derivative, diffusion, and weighted source terms under the standard scaling ansatz for the blow-up profile and support radius; this balancing is an algebraic step that produces the candidate rates but does not presuppose the final inequalities. The subsequent upper and lower bounds on ||u(·,t)||_∞ and the support expansion are then proved via comparison principles and integral estimates that operate on the PDE itself, independent of the scaling calculation. The blow-up-set dichotomy is stated explicitly under an additional “suitable condition” that is not derived from the rates, and no self-citations, fitted parameters, or self-definitional loops appear in the load-bearing steps. The argument is therefore self-contained once the existence of compactly supported finite-time blow-up solutions is granted.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The claims rest on the existence of compactly supported blowing-up solutions and on standard comparison and scaling techniques for quasilinear parabolic equations; no new entities are introduced and no parameters are fitted to data.

axioms (2)

domain assumption Existence of compactly supported solutions with finite blow-up time T
The rate statements are conditioned on the existence of such solutions.
standard math Comparison principles and scaling invariance for the quasilinear operator
Used to obtain upper and lower bounds on the L^∞ norm and support radius.

pith-pipeline@v0.9.0 · 5563 in / 1546 out tokens · 59915 ms · 2026-05-10T19:04:30.059350+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.

Cost/FunctionalEquation washburn_uniqueness_aczel unclear

?

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

Blow-up rates ... α= (σ+2)/L , β= (m-p)/L , L=σ(m-1)+2(p-1). ... self-similar form U(x,t;σ)=(T-t)^{-α}f(ζ), ζ:=|x|(T-t)^β ... profile f solving (f^m)'' + ... + |ζ|^σ f^p =0
Foundation/RealityFromDistinction reality_from_one_distinction unclear

?

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

We also analyze the blow-up sets ... either B(u)=R^N or blow-up occurs only as |x|→∞ ... under a suitable condition

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

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[1] [1]

Andreucci and E

D. Andreucci and E. DiBenedetto,On the Cauchy problem and initial traces for a class of evolution equations with strongly nonlinear sources, Ann. Scuola Norm. Sup. Pisa,18(1991)

work page 1991

[2] [2]

Andreucci and A

D. Andreucci and A. F. Tedeev,Universal bounds at the blow-up time for nonlinear parabolic equations, Adv. Differential Equations,10(2005), no. 1, 89-120

work page 2005

[3] [3]

Baras and R

P. Baras and R. Kersner,Local and global solvability of a class of semilinear parabolic equa- tions, J. Differential Equations,68(1987), 238-252

work page 1987

[4] [4]

Brezis and L

H. Brezis and L. Oswald,Remarks on sublinear elliptic equations, Nonlinear Anal.,10(1986), no. 1, 55-64

work page 1986

[5] [5]

Ferreira and A

R. Ferreira and A. de Pablo,Grow-up for a quasilinear heat equation with a localized reaction in higher dimensions, Rev. Mat. Complut.,31(2018), no. 3, 805-832

work page 2018

[6] [6]

Ferreira and A

R. Ferreira and A. de Pablo,Blow-up rates for a fractional heat equation, Proc. Am. Math. Soc.,149(2021), no. 5, 2011-2018

work page 2021

[7] [7]

Ferreira and A

R. Ferreira and A. de Pablo,A nonlinear diffusion equation with reaction localized in the half-line, Mathematics in Engineering,4(2022), no. 3, 1-24

work page 2022

[8] [8]

Ferreira, A

R. Ferreira, A. de Pablo and J. L. V´ azquez,Classification of blow-up with nonlinear diffusion and localized reaction, J. Differential Equations,231(2006), no. 1, 195-211

work page 2006

[9] [9]

Fila and Ph

M. Fila and Ph. Souplet,The blow-up rate for semilinear parabolic problems on general do- mains, NoDEA Nonlinear Differ. Equ. Appl.,8(2001), no. 4, 473-480

work page 2001

[10] [10]

Filippas and A

S. Filippas and A. Tertikas,On similarity solutions of a heat equation with a nonhomogeneous nonlinearity, J. Differential Equations,165(2000), no. 2, 468-492

work page 2000

[11] [11]

V. A. Galaktionov,On asymptotic self-similar behaviour for a quasilinear heat equation: single point blow-up, SIAM J. Math. Anal.,26(1995), no. 3, 675-693

work page 1995

[12] [12]

V. A. Galaktionov and J. L. V´ azquez,Extinction for a quasilinear heat equation with ab- sorption I. Technique of intersection comparison, Comm. Partial Differential Equations,19 (1994), no. 7-8, 1075-1106

work page 1994

[13] [13]

Gidas, W.-M

B. Gidas, W.-M. Ni and L. Nirenberg,Symmetry and related properties via the maximum principle, Comm. Math. Phys.,68(1979), no. 3, 209-243

work page 1979

[14] [14]

Giga and N

Y. Giga and N. Umeda,On blow-up at space infinity for semilinear heat equations, J. Math. Anal. Appl.,316(2006), 538-555. 13

work page 2006

[15] [15]

Guo, C.-S

J.-S. Guo, C.-S. Lin and M. Shimojo,Blow-up behavior for a parabolic equation with spatially dependent coefficient, Dynam. Systems Appl.,19(2010), no. 3-4, 415-433

work page 2010

[16] [16]

Guo and M

J.-S. Guo and M. Shimojo,Blowing up at zero points of potential for an initial boundary value problem, Commun. Pure Appl. Anal.,10(2011), no. 1, 161-177

work page 2011

[17] [17]

Guo, C.-S

J.-S. Guo, C.-S. Lin and M. Shimojo,Blow-up for a reaction-diffusion equation with variable coefficient, Appl. Math. Lett.,26(2013), no. 1, 150-153

work page 2013

[18] [18]

Guo, and P

J.-S. Guo, and P. Souplet,Excluding blowup at zero points of the potential by means of Liouville-type theorems, J. Differential Equations,265(2018), no. 10, 4942-4964

work page 2018

[19] [19]

Hu,Remarks on the blowup estimate for solution of the heat equation with a nonlinear boundary condition, Differential Integral Equations,9(1996), 891-901

B. Hu,Remarks on the blowup estimate for solution of the heat equation with a nonlinear boundary condition, Differential Integral Equations,9(1996), 891-901

work page 1996

[20] [20]

R. G. Iagar and Ph. Lauren¸ cot,Non-existence of non-negative separate variable solutions to a porous medium equation with spatially dependent nonlinear source, Bull. Sci. Math.,179 (2022), Article ID 103167, 13 pp

work page 2022

[21] [21]

R. G. Iagar, M. Latorre and A. S´ anchez,Blow-up patterns for a reaction-diffusion equation with weighted reaction in general dimension, Adv. Differential Equations,29(2024), no. 7-8, 515-574

work page 2024

[22] [22]

R. G. Iagar, M. Latorre and A. S´ anchez,Optimal existence, uniqueness and blow-up for a quasilinear diffusion equation with spatially inhomogeneous reaction, J. Math. Anal. Appl., 533(2024), no. 2, Article ID 128001, 18p

work page 2024

[23] [23]

R. G. Iagar and A. S´ anchez,Blow up profiles for a quasilinear reaction-diffusion equation with weighted reaction with linear growth, J. Dynam. Differential Equations,31(2019), no. 4, 2061-2094

work page 2019

[24] [24]

R. G. Iagar and A. S´ anchez,Blow up profiles for a reaction-diffusion equation with critical weighted reaction, Nonlinear Anal.,191(2020), Article ID 111628, 24p

work page 2020

[25] [25]

R. G. Iagar and A. S´ anchez,Blow up profiles for a quasilinear reaction-diffusion equation with weighted reaction, J. Differential Equations,272(2021), no. 1, 560-605

work page 2021

[26] [26]

R. G. Iagar and A. S´ anchez,Separate variable blow-up patterns for a reaction-diffusion equation with critical weighted reaction, Nonlinear Anal.,217(2022), Article ID 112740, 33p

work page 2022

[27] [27]

X. Kang, W. Wang and X. Zhou,Classification of solutions of porous medium equation with localized reaction in higher space dimensions, Differential Integral Equations,24(2011), no. 9-10, 909-922

work page 2011

[28] [28]

A. A. Lacey,The form of blow-up for nonlinear parabolic equations, Proc. Royal Society Edinburgh Sect. A,98(1984), no. 1-2, 183-202

work page 1984

[29] [29]

Liang,On the critical exponents for porous medium equation with a localized reaction in high dimensions, Commun

Z. Liang,On the critical exponents for porous medium equation with a localized reaction in high dimensions, Commun. Pure Appl. Anal.,11(2012), no. 2, 649-658

work page 2012

[30] [30]

G. M. Lieberman,Second Order Parabolic Differential Equations, World Scientific, Singa- pore, 1996. 14

work page 1996

[31] [31]

Mukai and Y

A. Mukai and Y. Seki,Refined construction of Type II blow-up solutions for semilinear heat equations with Joseph-Lundgren supercritical nonlinearity, Discrete Cont. Dynamical Systems, 41(2021), no. 10, 4847-4885

work page 2021

[32] [32]

R. G. Pinsky,Existence and nonexistence of global solutions foru t = ∆u+a(x)u p inR d, J. Differential Equations,133(1997), no. 1, 152-177

work page 1997

[33] [33]

R. G. Pinsky,The behavior of the life span for solutions tou t = ∆u+a(x)u p inR d, J. Differential Equations,147(1998), no. 1, 30-57

work page 1998

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