A new critical exponent for the semilinear damped wave equation with Hartree-type nonlinearity and initial data from homogeneous Besov spaces
Pith reviewed 2026-05-08 05:41 UTC · model grok-4.3
The pith
The critical exponent for global existence versus blow-up of small solutions to the damped wave equation with Hartree nonlinearity is p1 + p2 = 1 + (4 + 2γ)/(n + 2β) when data lie in homogeneous Besov spaces.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
We identify a new critical exponent given by p1 + p2 := p_Fuji((n + 2β)/(2 + γ)) := 1 + (4 + 2γ)/(n + 2β) for β ∈ [0, n/2) and γ ∈ [0, n). Global (in time) existence of small-data solutions holds in the supercritical and critical regimes p1 + p2 ≥ p_Fuji((n + 2β)/(2 + γ)). Finite-time blow-up of weak solutions occurs, even for arbitrarily small initial data, in the subcritical range 2 < p1 + p2 < p_Fuji((n + 2β)/(2 + γ)). The proofs rely on decay estimates for the linear damped wave equation in homogeneous Besov spaces dot B_{2,∞}^{-β} combined with refined harmonic analysis tools.
What carries the argument
The critical exponent p_Fuji((n + 2β)/(2 + γ)) = 1 + (4 + 2γ)/(n + 2β), derived from linear decay estimates in dot B_{2,∞}^{-β} that control the Hartree term I_γ(|u|^{p1}) |u|^{p2} via harmonic analysis.
Load-bearing premise
The linear damped wave equation admits decay estimates in homogeneous Besov spaces dot B_{2,∞}^{-β} that are strong enough, when paired with harmonic analysis, to control the nonlocal Hartree nonlinearity.
What would settle it
An explicit weak solution with p1 + p2 slightly below the critical value that remains global for small data, or a solution at the critical value that blows up in finite time, would disprove the claimed sharpness.
read the original abstract
In this paper, we investigate the critical exponent for a semi-linear damped wave equation involving a Hartree-type nonlinearity of the form $\mathcal{I}_\gamma\left(|u|^{p_1}\right)|u|^{p_2}, p_1, p_2>0, \gamma \in[0, n)$, with initial data taken in the homogeneous Besov spaces $\dot{B}_{2, \infty}^{-\beta}$, where $\beta \in\left[0, \frac{n}{2}\right)$. Our approach is based on deriving decay estimates for solutions to the associated linear damped wave equation with initial data belonging to $\dot{B}_{2, \infty}^{-\beta}$, combined with refined tools from Harmonic Analysis. As a consequence, we identify a new critical exponent given by $$ p_1+p_2:=p_{\mathrm{Fuji}}\left(\tfrac{n+2\beta}{2+\gamma}\right):=1+\tfrac{4+2\gamma}{n+2\beta} \quad \text{ for } \beta \in\left[0, \tfrac{n}{2}\right) \text{ and } \gamma \in [0, n). $$ More precisely, we establish the global (in time) existence of small data solutions in the supercritical and critical regimes $p_1+p_2 \geq p_{\mathrm{Fuji}}\left(\frac{n+2 \beta}{2+\gamma}\right)$. In contrast, we prove finite-time blow-up of weak solutions, even for arbitrarily small initial data, in the subcritical range $2<p_1+p_2<p_{\mathrm{Fuji}}\left(\frac{n+2 \beta}{2+\gamma}\right)$.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper studies the critical exponent for the semilinear damped wave equation with Hartree-type nonlinearity of the form I_γ(|u|^{p1})|u|^{p2} and initial data in homogeneous Besov spaces Ḃ_{2,∞}^{-β}. It derives linear decay estimates for the associated linear damped wave equation in these spaces, combines them with harmonic analysis tools to control the nonlocal term, and identifies the critical value p1 + p2 = 1 + (4 + 2γ)/(n + 2β). Global existence of small-data solutions is proved for p1 + p2 ≥ this threshold, while finite-time blow-up of weak solutions (even for small data) is shown for 2 < p1 + p2 < the threshold.
Significance. If the linear decay estimates are sharp, the result extends Fujita-type critical exponents to a nonlocal Hartree nonlinearity in the setting of homogeneous Besov data, with the parameter-dependent threshold providing a precise, falsifiable prediction. The approach of pairing linear decay with refined harmonic analysis for the fractional integral operator is a methodological strength that could apply to related nonlocal problems.
major comments (2)
- [Linear estimates section] The linear decay estimates for the damped wave equation in Ḃ_{2,∞}^{-β} (derived in the section on linear estimates) are load-bearing for both the existence and blow-up results. The claimed time-decay rate must be verified explicitly against the Fourier multiplier for the damped-wave propagator to confirm it yields precisely the exponent p_Fuji((n+2β)/(2+γ)) uniformly for β ∈ [0, n/2) and γ ∈ [0, n). A weaker decay would invalidate the sharpness of the critical regime.
- [Existence proof section] In the fixed-point argument for global existence (in the supercritical/critical regime), the control of the Hartree term I_γ(|u|^{p1})|u|^{p2} via Besov embeddings and fractional integrals must close the Duhamel integral with the exact decay rate from the linear part. The manuscript should state the admissible range for p1, p2 separately (beyond their sum) to ensure the estimates hold without additional restrictions on the parameters.
minor comments (2)
- [Abstract] The abstract introduces the notation p_Fuji without a brief parenthetical explanation of its relation to the classical Fujita exponent; adding this would improve readability for a broad audience.
- [Throughout] Notation for the homogeneous Besov space is written inconsistently as Ḃ versus dot{B}; standardize throughout the manuscript.
Simulated Author's Rebuttal
We thank the referee for the careful reading and constructive comments on our manuscript. We address each major comment point by point below and indicate the revisions planned.
read point-by-point responses
-
Referee: [Linear estimates section] The linear decay estimates for the damped wave equation in Ḃ_{2,∞}^{-β} (derived in the section on linear estimates) are load-bearing for both the existence and blow-up results. The claimed time-decay rate must be verified explicitly against the Fourier multiplier for the damped-wave propagator to confirm it yields precisely the exponent p_Fuji((n+2β)/(2+γ)) uniformly for β ∈ [0, n/2) and γ ∈ [0, n). A weaker decay would invalidate the sharpness of the critical regime.
Authors: We appreciate this observation regarding the centrality of the linear estimates. In the manuscript, the decay rates are derived from the Fourier multiplier of the damped-wave propagator via Littlewood-Paley decomposition in Ḃ_{2,∞}^{-β}, yielding time-decay that produces exactly the stated critical exponent p_Fuji((n+2β)/(2+γ)) uniformly over β ∈ [0, n/2) and γ ∈ [0, n). To address the request for explicit verification, we will revise the linear estimates section to include a more detailed computation of the multiplier estimates confirming this decay rate and its uniformity. revision: yes
-
Referee: [Existence proof section] In the fixed-point argument for global existence (in the supercritical/critical regime), the control of the Hartree term I_γ(|u|^{p1})|u|^{p2} via Besov embeddings and fractional integrals must close the Duhamel integral with the exact decay rate from the linear part. The manuscript should state the admissible range for p1, p2 separately (beyond their sum) to ensure the estimates hold without additional restrictions on the parameters.
Authors: We thank the referee for this suggestion to improve clarity. While the critical exponent depends on the sum p1 + p2, the estimates for the nonlocal term via the fractional integral I_γ and Besov embeddings do depend on the individual values to close without further restrictions. In the revised manuscript, we will explicitly state the admissible ranges for p1 and p2 separately in the existence section (in addition to the sum condition), ensuring the fixed-point argument applies under the stated parameter regimes. revision: yes
Circularity Check
No circularity; critical exponent follows from linear decay estimates
full rationale
The manuscript derives decay estimates for the linear damped wave equation in Ḃ_{2,∞}^{-β} and applies standard harmonic-analysis estimates to the Hartree term to obtain the threshold p1+p2 = 1 + (4+2γ)/(n+2β). Global existence above the threshold and blow-up below it are closed via Duhamel iteration and test-function arguments that use these decay rates directly. No parameter is fitted to data and then renamed as a prediction, no self-citation chain is load-bearing, and the exponent is not defined in terms of itself. The argument is therefore self-contained against the stated linear estimates and does not reduce to its own inputs by construction.
Axiom & Free-Parameter Ledger
axioms (2)
- domain assumption Decay estimates hold for solutions of the linear damped wave equation with initial data in Ḃ_{2,∞}^{-β}
- standard math Standard embedding and multiplier theorems in homogeneous Besov spaces apply to the Hartree nonlinearity
Reference graph
Works this paper leans on
-
[1]
H. Bahouri, J.-Y. Chemin, R. Danchin, Fourier analysis and nonlinear partial differential equations,Grundlehren Math. Wiss., vol. 343, Springer, Heidelberg, 2011
work page 2011
-
[2]
R.N. Bhattacharya, L. Chen, S. Dobson, R.B. Guenther, C. Orum, M. Ossiander, E. Thomann, E.C. Waymire, Majorizing Kernels and Stochastic Cascades with Applications to Incompressible Navier-Stokes Equations,Trans. Amer. Math. Soc.,355, 5003–5040 (2003)
work page 2003
-
[3]
Brandolese, Characterization of solutions to dissipative systems with sharp algebraic decay,SIAM J
L. Brandolese, Characterization of solutions to dissipative systems with sharp algebraic decay,SIAM J. Math. Anal.,48(3) (2016), 1616–1633
work page 2016
-
[4]
W. Chen, M. Reissig, On the critical exponent and sharp lifespan estimates for semilinear damped wave equations with data from Sobolev spaces of negative order,J. Evol. Equa.,355, pp 13 (2023)
work page 2023
-
[5]
M. D’Abbicco, M.R. Ebert, A new phenomenon in the critical exponent for structurally damped semi-linear evolution equations,Nonlinear Analysis,149(2017), 1–40
work page 2017
-
[6]
R. Filippucci, M. Ghergu, Singular solutions for coercive quasilinear elliptic inequalities with nonlocal terms,Non- linear Anal.,197(2020) 111857
work page 2020
-
[7]
R. Filippucci, M. Ghergu, Fujita type results for quasilinear parabolic inequalities with nonlocal terms,Discrete Contin. Dyn. Syst. A,42(2022), 1817–1833
work page 2022
-
[8]
R. Filippucci, M. Ghergu, Higher order evolution inequalities with nonlinear convolution terms,Nonlinear Analysis, 221(2022), 112881
work page 2022
- [9]
- [10]
-
[11]
Hartree, The wave mechanics of an atom with a non-Coulomb central field
D.R. Hartree, The wave mechanics of an atom with a non-Coulomb central field. Part I. Theory and methods,Math. Proc. Cambridge Philos. Soc.,24(1928), 89–110
work page 1928
-
[12]
Hartree, The wave mechanics of an atom with a non-Coulomb central field
D.R. Hartree, The wave mechanics of an atom with a non-Coulomb central field. Part II. Some results and discussion, Math. Proc. Cambridge Philos. Soc.,24(1928), 111–132
work page 1928
-
[13]
Hartree, The wave mechanics of an atom with a non-Coulomb central field
D.R. Hartree, The wave mechanics of an atom with a non-Coulomb central field. Part III. Term values and intensities in series in optical spectra,Math. Proc. Cambridge Philos. Soc.,24(1928), 426–437
work page 1928
- [14]
- [15]
-
[16]
R. Ikehata, New decay estimates for linear damped wave equations and its application to nonlinear problem,Math. Methods Appl. Sci.,27(8) (2004) 865–889. 18 P.D. AN
work page 2004
-
[17]
R. Ikehata, M. Ohta, Critical exponents for semilinear dissipative wave equations inR N,J. Math. Anal. Appl.,269 (1), 87–97 (2002)
work page 2002
-
[18]
R. Ikehata, K. Tanizawa, Global existence of solutions for semilinear damped wave equations inR N with noncom- pactly supported initial data,Nonlinear Anal.,61(7) (2005) 1189–1208
work page 2005
-
[19]
Landkof, Foundations of modern potential theory, translated by A
N.S. Landkof, Foundations of modern potential theory, translated by A. P. Doohovskoy,Grundlehren der mathe- matischen Wissenschaften, Springer, New York-Heidelberg (1972)
work page 1972
-
[20]
Lieb, Sharp constants in the Hardy-Littlewood-Sobolev and related inequalities,Ann
E.H. Lieb, Sharp constants in the Hardy-Littlewood-Sobolev and related inequalities,Ann. of Math.,118, 349–374 (1983)
work page 1983
- [21]
-
[22]
Matsumura, On the asymptotic behavior of solutions of semi-linear wave equations,Publ
A. Matsumura, On the asymptotic behavior of solutions of semi-linear wave equations,Publ. Res. Inst. Math. Sci., 12(1976), 169–189
work page 1976
-
[23]
H. Hajaiej, L. Molinet, T. Ozawa, B. Wang, Necessary and sufficient conditions for the fractional Gagliardo- Nirenberg inequalities and applications to Navier-Stokes and generalized boson equations. Harmonic analysis and nonlinear partial differential equations, 159-175,RIMS Kˆ okyˆ uroku Bessatsu, B26, Research Institute for Mathe- matical Sciences (RIMS...
work page 2011
- [24]
- [25]
- [26]
-
[27]
Pekar, Untersuchung ¨ uber die Elektronentheorie der Kristalle, Akademie Verlag, Berlin, 1954
S. Pekar, Untersuchung ¨ uber die Elektronentheorie der Kristalle, Akademie Verlag, Berlin, 1954
work page 1954
-
[28]
E.M. Stein, Singular integrals and differentiability properties of functions, Princeton Mathematical Series. No.30, Princeton University Press, Princeton, N.J. (1970)
work page 1970
-
[29]
G. Todorova, B. Yordanov, Critical exponent for a nonlinear wave equation with damping,J. Differ. Equ.,174(2) (2001) 464–489
work page 2001
-
[30]
Zhang, A blow-up result for a nonlinear wave equation with damping: the critical case,C
Q.S. Zhang, A blow-up result for a nonlinear wave equation with damping: the critical case,C. R. Acad. Sci. Paris S´ er. I Math.,333(2), 109–114 (2001). Phan Duc An Department of Mathematics, Banking Academy of Vietnam 12 Chua Boc, Kim Lien, Hanoi, Vietnam Email address:anpd@hvnh.edu.vn
work page 2001
discussion (0)
Sign in with ORCID, Apple, or X to comment. Anyone can read and Pith papers without signing in.