A Doubly Critical Elliptic Problem with Submanifold Singularities
Pith reviewed 2026-05-10 15:38 UTC · model grok-4.3
The pith
Positive solutions exist for a doubly critical elliptic equation with submanifold singularities when local geometry and the potential h meet suitable conditions near the singular set.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
Under appropriate assumptions on the local geometry of Σ and the behavior of h near Σ, the mountain-pass theorem together with suitably chosen test functions yields positive solutions u in H_0^1(Ω) to the equation −Δu + h u = λ ρ_Σ^{−s1} u^{2^*_{s1}−1} + ρ_Σ^{−s2} u^{2^*_{s2}−1} for λ > 0 and 0 ≤ s2 < s1 < 2.
What carries the argument
Test functions built from the distance function to Σ that produce a mountain-pass critical value strictly below the compactness threshold of the associated functional.
If this is right
- Existence holds for any λ > 0 once the geometry of Σ and nearby values of h satisfy the stated conditions.
- The local embedding and curvature of Σ directly influence whether the energy level stays below the compactness threshold.
- The potential h must remain controlled near Σ so that it does not raise the mountain-pass value up to or above the critical limit.
- The dual critical exponents cause loss of compactness that is overcome only when the geometric and potential conditions are met.
Where Pith is reading between the lines
- The same test-function technique could be tried on equations with three or more distinct critical singular terms.
- Numerical approximation of solutions for concrete choices such as a circle inside a ball would provide an independent check of the existence threshold.
- The dependence on local geometry suggests analogous results may hold when the ambient space is a Riemannian manifold rather than Euclidean space.
Load-bearing premise
The local geometry of Σ and the values of h near Σ allow the chosen test functions to produce a mountain-pass energy level strictly below the threshold at which compactness fails.
What would settle it
An explicit submanifold Σ and potential h for which the mountain-pass level equals or exceeds the critical energy threshold while the other setup conditions hold, yet no positive solution exists.
read the original abstract
Let $N \ge 4$, $\Omega$ be a bounded domain in $\mathbb{R}^N$, and let $\Sigma \subset \Omega$ be a smooth closed submanifold of dimension $k$ with $2 \le k \le N-2$. We study the existence of positive solutions $u \in H_0^1(\Omega)$ to the Euler--Lagrange equation \[ -\Delta u + h u = \lambda\, \rho_{\Sigma}^{-s_1}\, u^{2^{*}_{s_1}-1} + \rho_{\Sigma}^{-s_2}\, u^{2^{*}_{s_2}-1} \quad \text{in } \Omega, \] where $h : \Omega \to \mathbb{R}$ is a continuous potential, $\lambda > 0$ is a real parameter, and $0 \le s_2 < s_1 < 2$. For $i=1,2$, the exponents \[ 2^{*}_{s_i} = \frac{2(N - s_i)}{N - 2} \] correspond to Hardy--Sobolev critical growth, and $\rho_{\Sigma} = \mathrm{dist}(\,\cdot\,, \Sigma)$ denotes the distance to the submanifold $\Sigma$. The problem involves two Hardy-type singular nonlinearities with different critical exponents, leading to a lack of compactness. Using variational methods, in particular the mountain pass lemma, together with a suitable construction of test functions, we prove existence results under appropriate assumptions. Our analysis shows that the local geometry of $\Sigma$ and the behavior of the potential $h$ near $\Sigma$ play a crucial role in the existence of positive solutions for this doubly critical problem.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The paper claims existence of positive solutions u in H_0^1(Ω) for the doubly critical problem -Δu + h u = λ ρ_Σ^{-s1} u^{2^*_{s1}-1} + ρ_Σ^{-s2} u^{2^*_{s2}-1} in a bounded domain Ω ⊂ R^N (N≥4), where Σ is a smooth closed k-dimensional submanifold (2≤k≤N-2) and 0≤s2<s1<2. The proof relies on the mountain-pass lemma together with explicit test-function constructions that exploit the local geometry of Σ and the behavior of the continuous potential h near Σ, ensuring the mountain-pass critical value lies strictly below the compactness threshold determined by the two Hardy-Sobolev constants.
Significance. If the central variational argument holds, the result extends the literature on critical elliptic problems with submanifold singularities to the doubly critical setting. The explicit dependence on local geometry of Σ and the potential h near Σ is a standard but essential device for obtaining the strict inequality needed for existence; the work therefore supplies a concrete existence theorem under geometrically natural hypotheses.
major comments (2)
- [§3] §3 (Palais-Smale condition): the argument that any (PS)_c sequence with c below the threshold is relatively compact must explicitly control the interaction between the two critical terms with distinct exponents 2^*_{s1} and 2^*_{s2}; the standard single-term concentration-compactness argument does not immediately extend when both terms are present at the same level.
- [§4] §4 (test-function construction): the energy estimate for the cut-off functions centered on Σ must be shown to produce a mountain-pass value strictly less than the sum of the two Hardy-Sobolev constants; the paper invokes assumptions on the local geometry and on h, but the precise quantitative dependence (e.g., the sign of the first-order term involving the mean curvature of Σ) is not displayed in the final inequality.
minor comments (2)
- [Abstract] The abstract states that existence holds “under appropriate assumptions” without listing them; a one-sentence summary of the geometric and potential hypotheses would improve readability.
- [§1] Notation for the two critical exponents 2^*_{s_i} is introduced twice (once in the abstract, once in the introduction); a single consolidated definition in §1 would avoid repetition.
Simulated Author's Rebuttal
We thank the referee for the careful reading and constructive comments on our manuscript. We appreciate the recognition that the result extends the literature on critical problems with submanifold singularities to the doubly critical setting. We address the two major comments point by point below and will incorporate the suggested clarifications into the revised version.
read point-by-point responses
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Referee: [§3] §3 (Palais-Smale condition): the argument that any (PS)_c sequence with c below the threshold is relatively compact must explicitly control the interaction between the two critical terms with distinct exponents 2^*_{s1} and 2^*_{s2}; the standard single-term concentration-compactness argument does not immediately extend when both terms are present at the same level.
Authors: We agree that the interaction between the two distinct critical exponents requires explicit control. The original argument in §3 adapts the concentration-compactness principle by considering the combined measure associated with both nonlinearities and using the strict inequality c < threshold to rule out dichotomy. However, to make this fully rigorous, we will revise the section to include a detailed decomposition showing that cross-interaction terms are controlled by the gap between s1 and s2, preventing simultaneous concentration at both levels below the sum of the constants. This expansion will be added without altering the overall strategy. revision: yes
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Referee: [§4] §4 (test-function construction): the energy estimate for the cut-off functions centered on Σ must be shown to produce a mountain-pass value strictly less than the sum of the two Hardy-Sobolev constants; the paper invokes assumptions on the local geometry and on h, but the precise quantitative dependence (e.g., the sign of the first-order term involving the mean curvature of Σ) is not displayed in the final inequality.
Authors: We concur that the quantitative dependence on the geometry of Σ and the potential h should be displayed explicitly. In the revised §4, we will provide the complete asymptotic expansion of the energy for the cut-off test functions, isolating the first-order contributions from the mean curvature of Σ and the local behavior of h. Under the manuscript's standing assumptions (which include a sign condition on the mean curvature and a suitable upper bound on h near Σ), this yields the strict inequality for the mountain-pass value. The revised text will state the resulting inequality in full detail. revision: yes
Circularity Check
No significant circularity; derivation relies on external variational theorems and explicit constructions
full rationale
The paper's central argument applies the mountain pass lemma (an external theorem) together with explicit test-function constructions to obtain a critical value strictly below the compactness threshold set by the two Hardy-Sobolev constants. The assumptions on the local geometry of Σ and the behavior of h near Σ are used only to verify the strict inequality in the energy functional; they are not defined in terms of the existence result itself. No step reduces by construction to a fitted parameter, self-citation chain, or renamed input. The derivation is therefore self-contained against standard external benchmarks.
Axiom & Free-Parameter Ledger
axioms (2)
- standard math Mountain pass lemma applies to the energy functional on H0^1(Ω)
- standard math Hardy-Sobolev inequalities hold for the critical exponents 2*_si
Reference graph
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