Classification of blow-ups for the Alt--Phillips problem in three dimensions

Xavier Fern\'andez-Real

arxiv: 2606.00538 · v1 · pith:IOAS2Y4Bnew · submitted 2026-05-30 · 🧮 math.AP

Classification of blow-ups for the Alt--Phillips problem in three dimensions

Xavier Fern\'andez-Real This is my paper

Pith reviewed 2026-06-28 18:31 UTC · model grok-4.3

classification 🧮 math.AP

keywords Alt-Phillips problemfree boundary regularityflatness theoremblow-up classificationstable solutionsthree dimensionshomogeneous solutions

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The pith

A flatness theorem shows that stable homogeneous solutions to the Alt-Phillips problem are flat in three dimensions for gamma up to 2/3.

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

The paper proves a flatness theorem for classical stable homogeneous solutions of the gamma-Alt-Phillips free boundary problem in three dimensions when the exponent gamma satisfies 0 < gamma ≤ 2/3. This result classifies the possible blow-ups of such solutions as flat. The flatness directly yields full regularity of the free boundary for minimizers of the associated energy functional in dimension three. A sympathetic reader cares because the theorem resolves the open regularity question for this class of free boundary problems under the stated assumptions on dimension and gamma.

Core claim

We prove a flatness theorem for classical stable homogeneous solutions of the γ-Alt--Phillips free boundary problem in three dimensions in the range 0<γ≤2/3, where γ is the exponent in the energy density |∇u|² + u^γ. In particular, this implies full regularity of the free boundary for minimizers of the corresponding Alt--Phillips energy in dimension 3.

What carries the argument

The flatness theorem for classical stable homogeneous solutions, which classifies their blow-ups.

If this is right

Minimizers of the Alt-Phillips energy have a fully regular free boundary in dimension 3.
Blow-ups of the considered solutions must be flat planes.
The regularity conclusion holds specifically for the given range of the exponent gamma.

Where Pith is reading between the lines

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

The classification may allow reduction of regularity questions for non-homogeneous solutions to the homogeneous case via blow-up analysis.
Similar flatness arguments could be tested on related free boundary problems with different nonlinearities.
The result leaves open whether the same flatness holds for larger gamma or in higher dimensions.

Load-bearing premise

The solutions under study are classical, stable, and homogeneous in three dimensions.

What would settle it

Existence of a non-flat classical stable homogeneous solution for some gamma in (0, 2/3] in three dimensions.

read the original abstract

We prove a flatness theorem for classical stable homogeneous solutions of the $\gamma$-Alt--Phillips free boundary problem in three dimensions in the range $0<\gamma\le 2/3$, where $\gamma$ is the exponent in the energy density $|\nabla u|^2+u^\gamma$. In particular, this implies full regularity of the free boundary for minimizers of the corresponding Alt--Phillips energy in dimension $3$.

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

Fernández-Real proves a flatness theorem for stable homogeneous solutions of the γ-Alt-Phillips problem in 3D for γ ≤ 2/3 that gives free-boundary regularity for minimizers.

read the letter

The central result is a flatness theorem for classical stable homogeneous solutions of the γ-Alt-Phillips problem in three dimensions when 0 < γ ≤ 2/3. This flatness upgrades to full regularity of the free boundary for minimizers of the energy.

The paper targets a range of γ that had remained open in dimension three. Prior work covered other exponents or dimensions, so this closes a specific gap by using stability and homogeneity to control the blow-up behavior. The argument follows the usual route in free-boundary regularity: flatness implies the desired conclusion once the hypotheses are in place.

On the evidence available, the claim holds together. The hypotheses are stated plainly, there is no sign of circular reasoning, and the stress-test found no internal inconsistency. The result is incremental but concrete, and it stays within the standard toolkit for these variational problems.

The main limitation is that the full proof steps are not visible, so the precise estimates near γ = 2/3 or the handling of stability cannot be checked directly. That is a normal situation for an abstract-only read rather than a flaw in the work itself.

The paper is written for people already working on free-boundary regularity for energies with singular terms. A reader who follows the Alt-Phillips or related obstacle-type problems will get a usable new statement. It is the sort of targeted advance that deserves a serious referee who can verify the details.

I would send it to peer review.

Referee Report

0 major / 1 minor

Summary. The manuscript proves a flatness theorem for classical stable homogeneous solutions of the γ-Alt--Phillips free boundary problem in three dimensions for 0<γ≤2/3. This is used to conclude full regularity of the free boundary for minimizers of the corresponding Alt--Phillips energy in dimension 3.

Significance. If correct, the result completes the regularity theory for this free-boundary problem in 3D within the stated γ-range by classifying blow-ups under the classical+stable+homogeneous hypotheses. It supplies a direct analytic argument without reliance on fitted parameters or self-referential quantities.

minor comments (1)

[Abstract] The abstract states the hypotheses (classical, stable, homogeneous) but does not indicate where in the manuscript the precise definitions of stability and homogeneity are fixed or how they enter the flatness argument.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for reviewing our manuscript. The provided summary accurately reflects the main theorem and its application to regularity of minimizers. The recommendation is listed as 'uncertain,' but the report contains no specific major comments or points of concern. Accordingly, we have no individual comments to address point by point. We remain available to supply additional details, clarifications, or expansions of any step in the proof if the referee identifies particular passages that require further explanation.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper is a pure existence/regularity proof in mathematical analysis for the Alt-Phillips free-boundary problem. It states a flatness theorem for classical stable homogeneous solutions in 3D (0<γ≤2/3) that implies free-boundary regularity for minimizers. No equations, fitted parameters, self-referential definitions, or load-bearing self-citations appear in the abstract or described claims. The derivation is presented as a direct analytic argument relying on the stated hypotheses (classical + stable + homogeneous) rather than any reduction to inputs by construction. This is the expected outcome for a theorem-proof paper with no empirical fitting or renaming steps.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Based solely on the abstract; no free parameters, invented entities, or non-standard axioms are mentioned. Relies on standard background from elliptic PDE and free boundary theory.

axioms (1)

standard math Standard assumptions and techniques from the theory of stable solutions to elliptic free boundary problems
Invoked implicitly to support the flatness result and regularity conclusion.

pith-pipeline@v0.9.1-grok · 5582 in / 1128 out tokens · 22217 ms · 2026-06-28T18:31:18.532157+00:00 · methodology

discussion (0)

Forward citations

Cited by 1 Pith paper

Reviewed papers in the Pith corpus that reference this work. Sorted by Pith novelty score.

Uniqueness of the blow-up for some Alt-Phillips cones
math.AP 2026-06 unverdicted novelty 7.0

Uniqueness of blow-ups with sharp convergence is established for Alt-Phillips cones via new logarithmic epiperimetric inequalities, yielding free-boundary uniqueness in low dimensions and a minimality characterization...

Reference graph

Works this paper leans on

23 extracted references · 1 canonical work pages · cited by 1 Pith paper

[1]

Allen, D

M. Allen, D. Kriventsov, and H. Shahgholian. The free boundary for semilinear problems with highly oscillating singular terms.J. Lond. Math. Soc., 111:Paper No. e70180, 2025

2025
[2]

H. W. Alt and L. A. Caffarelli. Existence and regularity for a minimum problem with free boundary.J. Reine Angew. Math., 325:105–144, 1981

1981
[3]

H. W. Alt and D. Phillips. A free boundary problem for semilinear elliptic equations.J. Reine Angew. Math., 368:63–107, 1986

1986
[4]

L. P. Bonorino. Regularity of the free boundary for some elliptic and parabolic problems. II.Comm. Partial Differential Equations, 26:355–380, 2001

2001
[5]

L. A. Caffarelli, D. Jerison, and C. E. Kenig. Global energy minimizers for free boundary problems and full regularity in three dimensions. InNoncompact Problems at the Intersection of Geometry, Analysis, and Topology, volume 350 ofContemp. Math., pages 83–97. Amer. Math. Soc., Providence, RI, 2004

2004
[6]

L. A. Caffarelli and S. Salsa.A Geometric Approach to Free Boundary Problems, volume 68 ofGrad. Stud. Math.Amer. Math. Soc., Providence, RI, 2005

2005
[7]

Carducci and G

M. Carducci and G. Tortone. Smoothness and stability in the alt–phillips problem.Math. Ann., 394:75, 2026

2026
[8]

De Silva and D

D. De Silva and D. Jerison. A singular energy minimizing free boundary.J. Reine Angew. Math., 635:1–22, 2009

2009
[9]

De Silva and O

D. De Silva and O. Savin. On certain degenerate one-phase free boundary problems.SIAM J. Math. Anal., 53:649–680, 2021

2021
[10]

Fernández-Real

X. Fernández-Real. Overview and recent progress on the classical Bernoulli free boundary problem. Forth- coming
[11]

Fernández-Real and H

X. Fernández-Real and H. Yu. Generic properties in free boundary problems.Amer. J. Math., 2023. To appear

2023
[12]

R. S. Hamilton. Three-manifolds with positive Ricci curvature.J. Differential Geom., 17:255–306, 1982

1982
[13]

Y. Hu, Y. Wei, B. Yang, and T. Zhou. A complete family of Alexandrov–Fenchel inequalities for convex capillary hypersurfaces in the half-space.Math. Ann., 390:3039–3075, 2024

2024
[14]

H. Ishii. On the equivalence of two notions of weak solutions, viscosity solutions and distribution solutions. Funkcial. Ekvac., 38:101–120, 1995

1995
[15]

Jerison and O

D. Jerison and O. Savin. Some remarks on stability of cones for the one-phase free boundary problem. Geom. Funct. Anal., 25:1240–1257, 2015

2015
[16]

Karakhanyan and T

A. Karakhanyan and T. Sanz-Perela. Stable cones in the Alt–Phillips free boundary problem.Calc. Var. Partial Differential Equations, 65:Paper No. 83, 2026

2026
[17]

Phillips

D. Phillips. A minimization problem and the regularity of solutions in the presence of a free boundary. Indiana Univ. Math. J., 32:1–17, 1983

1983
[18]

Restrepo and X

D. Restrepo and X. Ros-Oton.C∞ regularity in semilinear free boundary problems.Math. Ann., 392:3397– 3446, 2025

2025
[19]

Savin and H

O. Savin and H. Yu. Stable and minimizing cones in the Alt–Phillips problem, 2025. arXiv:2502.18192

work page arXiv 2025
[20]

Savin and H

O. Savin and H. Yu. Concentration of cones in the Alt–Phillips problem.Arch. Ration. Mech. Anal., 250:Paper No. 35, 2026

2026
[21]

Tao.Topics in Random Matrix Theory, volume 132 ofGrad

T. Tao.Topics in Random Matrix Theory, volume 132 ofGrad. Stud. Math.Amer. Math. Soc., Providence, RI, 2012

2012
[22]

Velichkov.Regularity of the One-Phase Free Boundaries, volume 28 ofLecture Notes Unione Mat

B. Velichkov.Regularity of the One-Phase Free Boundaries, volume 28 ofLecture Notes Unione Mat. Ital. Springer, Cham, 2023

2023
[23]

G. S. Weiss. Partial regularity for weak solutions of an elliptic free boundary problem.Comm. Partial Differential Equations, 23:439–455, 1998. EPFL SB, Station 8, 1015 Lausanne, Switzerland Email address:xavier.fernandez-real@epfl.ch

1998

[1] [1]

Allen, D

M. Allen, D. Kriventsov, and H. Shahgholian. The free boundary for semilinear problems with highly oscillating singular terms.J. Lond. Math. Soc., 111:Paper No. e70180, 2025

2025

[2] [2]

H. W. Alt and L. A. Caffarelli. Existence and regularity for a minimum problem with free boundary.J. Reine Angew. Math., 325:105–144, 1981

1981

[3] [3]

H. W. Alt and D. Phillips. A free boundary problem for semilinear elliptic equations.J. Reine Angew. Math., 368:63–107, 1986

1986

[4] [4]

L. P. Bonorino. Regularity of the free boundary for some elliptic and parabolic problems. II.Comm. Partial Differential Equations, 26:355–380, 2001

2001

[5] [5]

L. A. Caffarelli, D. Jerison, and C. E. Kenig. Global energy minimizers for free boundary problems and full regularity in three dimensions. InNoncompact Problems at the Intersection of Geometry, Analysis, and Topology, volume 350 ofContemp. Math., pages 83–97. Amer. Math. Soc., Providence, RI, 2004

2004

[6] [6]

L. A. Caffarelli and S. Salsa.A Geometric Approach to Free Boundary Problems, volume 68 ofGrad. Stud. Math.Amer. Math. Soc., Providence, RI, 2005

2005

[7] [7]

Carducci and G

M. Carducci and G. Tortone. Smoothness and stability in the alt–phillips problem.Math. Ann., 394:75, 2026

2026

[8] [8]

De Silva and D

D. De Silva and D. Jerison. A singular energy minimizing free boundary.J. Reine Angew. Math., 635:1–22, 2009

2009

[9] [9]

De Silva and O

D. De Silva and O. Savin. On certain degenerate one-phase free boundary problems.SIAM J. Math. Anal., 53:649–680, 2021

2021

[10] [10]

Fernández-Real

X. Fernández-Real. Overview and recent progress on the classical Bernoulli free boundary problem. Forth- coming

[11] [11]

Fernández-Real and H

X. Fernández-Real and H. Yu. Generic properties in free boundary problems.Amer. J. Math., 2023. To appear

2023

[12] [12]

R. S. Hamilton. Three-manifolds with positive Ricci curvature.J. Differential Geom., 17:255–306, 1982

1982

[13] [13]

Y. Hu, Y. Wei, B. Yang, and T. Zhou. A complete family of Alexandrov–Fenchel inequalities for convex capillary hypersurfaces in the half-space.Math. Ann., 390:3039–3075, 2024

2024

[14] [14]

H. Ishii. On the equivalence of two notions of weak solutions, viscosity solutions and distribution solutions. Funkcial. Ekvac., 38:101–120, 1995

1995

[15] [15]

Jerison and O

D. Jerison and O. Savin. Some remarks on stability of cones for the one-phase free boundary problem. Geom. Funct. Anal., 25:1240–1257, 2015

2015

[16] [16]

Karakhanyan and T

A. Karakhanyan and T. Sanz-Perela. Stable cones in the Alt–Phillips free boundary problem.Calc. Var. Partial Differential Equations, 65:Paper No. 83, 2026

2026

[17] [17]

Phillips

D. Phillips. A minimization problem and the regularity of solutions in the presence of a free boundary. Indiana Univ. Math. J., 32:1–17, 1983

1983

[18] [18]

Restrepo and X

D. Restrepo and X. Ros-Oton.C∞ regularity in semilinear free boundary problems.Math. Ann., 392:3397– 3446, 2025

2025

[19] [19]

Savin and H

O. Savin and H. Yu. Stable and minimizing cones in the Alt–Phillips problem, 2025. arXiv:2502.18192

work page arXiv 2025

[20] [20]

Savin and H

O. Savin and H. Yu. Concentration of cones in the Alt–Phillips problem.Arch. Ration. Mech. Anal., 250:Paper No. 35, 2026

2026

[21] [21]

Tao.Topics in Random Matrix Theory, volume 132 ofGrad

T. Tao.Topics in Random Matrix Theory, volume 132 ofGrad. Stud. Math.Amer. Math. Soc., Providence, RI, 2012

2012

[22] [22]

Velichkov.Regularity of the One-Phase Free Boundaries, volume 28 ofLecture Notes Unione Mat

B. Velichkov.Regularity of the One-Phase Free Boundaries, volume 28 ofLecture Notes Unione Mat. Ital. Springer, Cham, 2023

2023

[23] [23]

G. S. Weiss. Partial regularity for weak solutions of an elliptic free boundary problem.Comm. Partial Differential Equations, 23:439–455, 1998. EPFL SB, Station 8, 1015 Lausanne, Switzerland Email address:xavier.fernandez-real@epfl.ch

1998