Integral representation using Green function for fractional Hardy equation
Pith reviewed 2026-05-25 13:05 UTC · model grok-4.3
The pith
The Green function for the fractional Hardy operator represents its weak solutions as integrals.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
The Green function for the fractional Hardy operator P exists and is sufficiently regular when 0 less than theta less than Lambda sub N,s, and every weak solution u of P u equals f satisfies u(x) equals the integral of the Green function G(x,y) times f(y) dy.
What carries the argument
The Green function for the operator P equals (-Delta)^s minus theta over |x| to the 2s, which converts weak solutions into explicit integrals.
Load-bearing premise
The Green function for the operator P exists and is sufficiently regular in the stated range of theta to permit the integral representation.
What would settle it
Finding a weak solution u of P u equals f that cannot be recovered as the integral of any candidate Green function against f would disprove the representation claim.
read the original abstract
Our main aim is to study Green function for the fractional Hardy operator $P:=(-\Delta)^s -\frac{\theta}{|x|^{2s}}$ in $\mathbb{R}^N$, where $0<\theta<\Lambda_{N,s}$ and $\Lambda_{N,s}$ is the best constant in the fractional Hardy inequality. Using Green function, we also show that the integral representation of the weak solution holds.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper studies the Green function for the fractional Hardy operator P = (-Δ)^s - θ/|x|^{2s} in R^N for 0 < θ < Λ_{N,s}, where Λ_{N,s} is the best constant in the fractional Hardy inequality. It claims that this Green function yields an integral representation for weak solutions of the associated equation.
Significance. If the result holds, the construction of a sufficiently regular Green function for this perturbed fractional Laplacian and the resulting integral representation formula would supply a useful analytic tool for studying weak solutions to fractional Hardy equations, extending classical representation techniques to this setting.
major comments (1)
- The central claim that weak solutions admit the integral representation u(x) = ∫ G(x,y) f(y) dy rests entirely on the existence and sufficient regularity of the Green function G for P in the range 0 < θ < Λ_{N,s}; the abstract supplies no proof sketch, technical conditions, or verification steps for this step.
Simulated Author's Rebuttal
Thank you for the opportunity to respond to the referee's report. We address the major comment below.
read point-by-point responses
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Referee: The central claim that weak solutions admit the integral representation u(x) = ∫ G(x,y) f(y) dy rests entirely on the existence and sufficient regularity of the Green function G for P in the range 0 < θ < Λ_{N,s}; the abstract supplies no proof sketch, technical conditions, or verification steps for this step.
Authors: The manuscript constructs the Green function for the fractional Hardy operator P in the range 0 < θ < Λ_{N,s} and establishes its key properties, including sufficient regularity. Using this, we prove the integral representation formula for weak solutions. While the abstract does not include a proof sketch (consistent with its purpose as a summary), the full paper details the technical conditions, construction, and verification steps in the subsequent sections. revision: no
Circularity Check
No significant circularity detected
full rationale
The abstract states the goal of studying the Green function for P = (-Δ)^s - θ/|x|^{2s} (0 < θ < Λ_{N,s}) and showing that weak solutions admit an integral representation via that Green function. No equations, fitted parameters, self-citations, or derivations are supplied that reduce the claimed representation to a definition or input by construction. The result is presented as depending on an independent existence and regularity proof for the Green function, which is not shown to be self-referential. This is the most common honest finding for an abstract-only description of a technical existence result.
Axiom & Free-Parameter Ledger
axioms (1)
- domain assumption Λ_{N,s} is the best constant in the fractional Hardy inequality
Reference graph
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discussion (0)
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