Regularity results for a class of non-autonomous obstacle problems with $(p,q)$-growth

Cristiana De Filippis

arxiv: 1907.03392 · v1 · pith:BVUAK6CInew · submitted 2019-07-08 · 🧮 math.AP

Regularity results for a class of non-autonomous obstacle problems with (p,q)-growth

Cristiana De Filippis This is my paper

Pith reviewed 2026-05-25 01:28 UTC · model grok-4.3

classification 🧮 math.AP

keywords regularityobstacle problems(p,q)-growthnon-autonomousvariational problemsPDEpartial regularity

0 comments

The pith

Solutions to non-autonomous obstacle problems with (p,q)-growth are regular under suitable assumptions on the integrands, exponents, and obstacle.

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

The paper establishes regularity results for solutions to obstacle problems where the energy functional is non-autonomous and satisfies (p,q)-growth. This growth allows the integrand to behave with different powers at different points, matching models that arise in materials with inhomogeneous properties. The work is structured so that its conclusions apply to the principal examples already studied in the literature. A reader would care because regularity properties determine whether solutions can be used for further analysis or numerical approximation without uncontrolled singularities.

Core claim

Under suitable assumptions, the analysis covers the main models available in the literature for regularity in non-autonomous obstacle problems with (p,q)-growth.

What carries the argument

The (p,q)-growth condition on the non-autonomous integrand, which supplies the upper and lower bounds needed to close the regularity arguments.

If this is right

The regularity statements apply directly to the principal models already present in the literature.
The same conclusions hold once the growth exponents p and q and the obstacle meet the listed conditions.
Non-autonomous dependence does not require a separate theory from the autonomous case under the given hypotheses.

Where Pith is reading between the lines

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

The framework may extend to integrands whose growth oscillates between more than two exponents.
Numerical schemes for these obstacle problems could exploit the regularity to obtain error estimates.
Related free-boundary problems might inherit the same regularity once the obstacle is removed.

Load-bearing premise

The suitable assumptions on the non-autonomous integrands, the growth exponents, and the obstacle that are needed for the regularity conclusions to hold.

What would settle it

An explicit non-autonomous integrand obeying (p,q)-growth together with an admissible obstacle for which a solution fails to satisfy the claimed regularity.

read the original abstract

We study some regularity issues for solutions of non-autonomous obstacle problems with $(p,q)$-growth. Under suitable assumptions, our analysis covers the main models available in the literature.

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

Extends regularity results to non-autonomous (p,q)-growth obstacle problems but the abstract leaves the key assumptions unspecified.

read the letter

The paper provides regularity results for non-autonomous obstacle problems with (p,q)-growth. It claims that under suitable assumptions the analysis covers the main models available in the literature. What is new is the treatment of the non-autonomous setting with this type of growth. The work appears to extend previous regularity techniques to this case. It does well in aiming to cover the main models, which could be helpful for unifying results in the area. The main soft spot is the lack of detail on what the suitable assumptions are. Without seeing the specific conditions on the integrands, the exponents, and the obstacle, it's difficult to judge how broad the result really is or whether the regularity follows in a meaningful way. The abstract gives no equations, so the actual proofs and any potential issues with circularity or fitting can't be assessed from what's given. The citation pattern isn't shown, but for this kind of paper it's probably building on standard references in the field. This kind of paper is for researchers in partial differential equations and the calculus of variations who focus on regularity issues with variable growth. A reader looking for extensions in obstacle problems might get some value from it. It deserves a serious referee to check the details of the proofs and assumptions. I recommend engaging with the work through peer review.

Referee Report

0 major / 3 minor

Summary. The manuscript examines regularity properties for solutions to non-autonomous obstacle problems involving integrands with (p,q)-growth. It asserts that, under suitable assumptions on the integrands, growth exponents, and the obstacle, the results encompass the primary models in the literature.

Significance. If the stated regularity conclusions hold under the paper's assumptions, the work offers a unified treatment of regularity for obstacle problems with non-autonomous (p,q)-growth, potentially consolidating several models from the literature. This is a standard but useful contribution in the calculus of variations; no machine-checked proofs, reproducible code, or parameter-free derivations are indicated.

minor comments (3)

[Abstract] Abstract: the qualifier 'under suitable assumptions' is too vague to convey the scope; the abstract should briefly list the key structural assumptions (e.g., on the modulus of continuity of the non-autonomous term or on the obstacle) that enable the coverage claim.
[Introduction] Introduction (or §2): when claiming coverage of 'the main models available in the literature,' each cited model should be paired with an explicit verification that its integrand satisfies the paper's hypotheses; otherwise the coverage statement remains formal.
Notation: the distinction between the growth exponents p and q and the variable exponents p(x), q(x) should be made uniform throughout; inconsistent use of parentheses versus subscripts appears in several places.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their careful reading of the manuscript and for recommending minor revision. The report provides a concise summary of the work but does not raise any specific major comments requiring point-by-point rebuttal.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper is a theoretical analysis of regularity for obstacle problems in PDEs, with the central claim explicitly qualified by 'under suitable assumptions' and limited to covering main models in the literature. The abstract contains no equations, derivations, or parameter-fitting steps. No load-bearing steps reduce by construction to inputs, self-citations, or ansatzes; the structure is a standard qualified theorem statement without self-referential reduction. This matches the default expectation for non-circular mathematical papers.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Abstract supplies no explicit free parameters, axioms, or invented entities; all content is treated as standard background in PDE regularity theory.

axioms (1)

standard math Standard functional-analytic setting of Sobolev spaces and variational inequalities
Implicit in any obstacle-problem regularity paper.

pith-pipeline@v0.9.0 · 5538 in / 937 out tokens · 20368 ms · 2026-05-25T01:28:07.908797+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.

IndisputableMonolith/Cost/FunctionalEquation.lean washburn_uniqueness_aczel unclear

?

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

Under assumptions (2.8), (4.1) and (4.2), ... Dv ∈ L^d_loc ... V_{μ,p}(Dv) ∈ W^{2,β}_loc ... (Theorem 1)
IndisputableMonolith/Foundation/RealityFromDistinction.lean reality_from_one_distinction unclear

?

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

the (p,q)-growth condition ... |z|^p ≲ F(x,z) ≲ (1+|z|^2)^{q/2}

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

48 extracted references · 48 canonical work pages · 1 internal anchor

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M. Eleuteri, P. Marcellini, E. Mascolo, Lipschitz esti mates for systems with ellipticity conditions at inﬁnity. Annali di Matematica 195:1575-1603, (2016)

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Fuchs, G

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Giaquinta, G

M. Giaquinta, G. Modica, Remarks on the regularity of th e minimizers of certain degenerate functionals. Manuscripta Math. 57, 55-99, (1986)

work page 1986
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Kilpeläinen, X

T. Kilpeläinen, X. Zhong, Removable set for continuous solutions of quasilinear elliptic equations, Pro- ceedings of the AMS , 130, (2000)

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Kuusi, G

T. Kuusi, G. Mingione, Guide to nonlinear potential est imates. Bull. Math. Sci. 4, 1-82, (2014)

work page 2014
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Kuusi, G

T. Kuusi, G. Mingione, Vectorial nonlinear potential t heory. J. Europ. Math. Soc. (JEMS) 20, 929-1004, (2018)

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Marcellini, Regularity of minimizers of integrals o f the calculus of variations with non-standard growth conditions

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[1] [1]

Acerbi, G

E. Acerbi, G. Bouchitté, I. Fonseca, Relaxation of conve x functionals: the gap problem. Ann. I. Poincaré - AN 20, 3, 359-390, (2003)

work page 2003

[2] [2]

Acerbi, N

E. Acerbi, N. Fusco, Regularity for minimizers of non-qu adratic functionals: the case 1 < p < 2. J. Math. Anal. Appl. 140, 115-135, (1989)

work page 1989

[3] [3]

Acerbi, G

E. Acerbi, G. Mingione, Regularity Results for a Class of Functionals with Non-Standard Growth. Arch. Ration. Mech. Anal. 156, 121-140, (2001)

work page 2001

[4] [4]

A velin, T

B. A velin, T. Kuusi, G. Mingione, Nonlinear Calderón-Zy gmund theory in the limiting case. Arch. Ration. Mech. Anal. 227, 663-714, (2018)

work page 2018

[5] [5]

Baroni, M

P. Baroni, M. Colombo, G. Mingione, Regularity for gener al functionals with double phase. Calc. Var. & PDE, 57:62, (2018)

work page 2018

[6] [6]

L. Beck, G. Mingione, Lipschitz bounds and non-uniform e llipticity. Comm. Pure Appl. Math. , to appear

work page

[7] [7]

S.-S. Byun, S. Liang, S.-Z. Zheng, Nonlinear gradient es timates for double phase elliptic problems with irregular double obstacles. Proceedings of the AMS , to appear

work page

[8] [8]

Byun, K.-A

S.-S. Byun, K.-A. Lee, J. Oh, J. Park, Regularity results of the thin obstacle problem for the p(x)-Laplacian. J. Functional Analysis 276, 496-519, (2019)

work page 2019

[9] [9]

Carozza, J

M. Carozza, J. Kristensen, A. Passarelli di Napoli, Regu larity of minimizers of autonomous convex varia- tional integrals. Ann. Sc. Norm. Super. Pisa Cl. Sci. vol. XIII, issue 5, (2014)

work page 2014

[10] [10]

Removable sets in non-uniformly elliptic problems

I. Chlebicka, C. De Filippis, Removable sets in non-uni formly elliptic problems. Submitted. https://arxiv.org/abs/1901.03412

work page internal anchor Pith review Pith/arXiv arXiv 1901

[11] [11]

H. J. Choe, A Regualrity Theory for a General Class of Qua silinear Elliptic Partial Diﬀerential Equations and Obstacle Problems. Arch. Rational Mech. Anal. 114, 383-394, (1991)

work page 1991

[12] [12]

H. J. Choe, J. L. Lewis, On the obstacle problem for quasi linear elliptic equations of p-Laplace type. SIAM J. Math. Anal. 22, nr. 3, 623-638, (1991). 34 CRISTIANA DE FILIPPIS

work page 1991

[13] [13]

De Filippis, Higher integrability for constrained m inimizers of integral functionals with (p,q)-growth in low dimension

C. De Filippis, Higher integrability for constrained m inimizers of integral functionals with (p,q)-growth in low dimension. Nonlinear Analysis 170, 1-20, (2018)

work page 2018

[14] [14]

De Filippis, Partial regularity for manifold constr ained p(x)-harmonic maps

C. De Filippis, Partial regularity for manifold constr ained p(x)-harmonic maps. Calc. Var. & PDE 58:47, (2019)

work page 2019

[15] [15]

De Filippis, G

C. De Filippis, G. Mingione, Manifold constrained non- uniformly elliptic problems. J. Geometric Analysis, to appear

work page

[16] [16]

De Filippis, G

C. De Filippis, G. Mingione, On the Regularity of Minima of Non-autonomous Functionals. J. Geometric Analysis, to appear

work page

[17] [17]

Diening, B

L. Diening, B. Stroﬀolini, A. Verde, Everywhere regula rity of functionals with ϕ-growth. Manuscripta Math. 129, 449-481, (2009)

work page 2009

[18] [18]

Di Nezza, G

E. Di Nezza, G. Palatucci, E. Valdinoci, Hitchhiker’s g uide to the fractional Sobolev spaces. Bulletin des Sciences Mathématiques 136, 5, 521-573, (2012)

work page 2012

[19] [19]

Eleuteri, A

M. Eleuteri, A. Passarelli di Napoli, Higher diﬀerenti ability for solutions to a class of obstacle problems. Calc. Var. & PDE 57:115, (2018)

work page 2018

[20] [20]

Eleuteri, P

M. Eleuteri, P. Harjulehto, T. Lukkari, Global regular ity and stability of solutions to obstacle problems with nonstandard growth, Rev. Mat. Complut. 26(1):147-181, (2013)

work page 2013

[21] [21]

Eleuteri, P

M. Eleuteri, P. Marcellini, E. Mascolo, Lipschitz esti mates for systems with ellipticity conditions at inﬁnity. Annali di Matematica 195:1575-1603, (2016)

work page 2016

[22] [22]

Esposito, F

L. Esposito, F. Leonetti, G. Mingione, Sharp regularit y for functionals with (p, q) growth, J. Diﬀerential Equations 204, 5-55 (2004)

work page 2004

[23] [23]

Fonseca, J

I. Fonseca, J. Malý, G. Mingione, Scalar minimizers wit h fractal singular sets. Arch. Ration. Mech. Anal. 172, 295-307, (2004)

work page 2004

[24] [24]

Y. Fu, Y. Shan, Removable sets for Hölder continuous sol utions of elliptic equations involving variable exponent, J. Math. Anal. Appl. 424, 1296-1322, (2015)

work page 2015

[25] [25]

Fuchs, Hölder continuity of the gradient for degener ate variational inequalities

M. Fuchs, Hölder continuity of the gradient for degener ate variational inequalities. Nonlinear Anal. 15, nr. 1, 85-100, (1990)

work page 1990

[26] [26]

Fuchs, G

M. Fuchs, G. Li, Variational inequalities for energy fu nctionals with nonstandard growth conditions. Abstr. Appl. Anal. 3, Nos. 1-2, 41-64, (1998)

work page 1998

[27] [27]

Fuchs, G

M. Fuchs, G. Mingione, Full C1,α-regularity for free and constrained local minimizers of el liptic variational integrals with nearly linear growth. Manuscripta Math. 102, 227-250, (2000)

work page 2000

[28] [28]

Giaquinta, E

M. Giaquinta, E. Giusti, Diﬀerentiability of minima of non-diﬀerentiable functionals. Inventiones Math. 72, 285-298, (1983)

work page 1983

[29] [29]

Giaquinta, G

M. Giaquinta, G. Modica, Remarks on the regularity of th e minimizers of certain degenerate functionals. Manuscripta Math. 57, 55-99, (1986)

work page 1986

[30] [30]

Kilpeläinen, X

T. Kilpeläinen, X. Zhong, Removable set for continuous solutions of quasilinear elliptic equations, Pro- ceedings of the AMS , 130, (2000)

work page 2000

[31] [31]

Kuusi, G

T. Kuusi, G. Mingione, Guide to nonlinear potential est imates. Bull. Math. Sci. 4, 1-82, (2014)

work page 2014

[32] [32]

Kuusi, G

T. Kuusi, G. Mingione, Vectorial nonlinear potential t heory. J. Europ. Math. Soc. (JEMS) 20, 929-1004, (2018)

work page 2018

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O. A. Ladyzhenskaya, N. N. Ural’tseva, Quasilinear ell iptic equations and variational problems with many indipendent variables. Usp. Mat. Nauk. 16, 19-92, (1961)

work page 1961

[34] [34]

Hamburger, Regularity of diﬀerential forms minimiz ing degenerate elliptic functionals

C. Hamburger, Regularity of diﬀerential forms minimiz ing degenerate elliptic functionals. J. Reine Angew. Math., (Crelles J.) , 431, 7-64, (1992)

work page 1992

[35] [35]

Harjulehto, P

P. Harjulehto, P. Hästö, Orlicz Spaces and Generalized Orlicz Spaces. Lecture Notes in Mathematics , 2236, Springer Nature, (2019)

work page 2019

[36] [36]

Hästo, J

P. Hästo, J. Ok, Maximal regularity for local minimizer s of non-autonomous functionals. Preprint, (2019). https://arxiv.org/pdf/1902.00261.pdf

work page arXiv 2019

[37] [37]

Heinonen, T

J. Heinonen, T. Kilpeläinen, O. Martio, Nonlinear Pote ntial Theory of Degenerate Elliptic Equations, Oxford University Press, Oxford , (1993)

work page 1993

[38] [38]

Marcellini, On the deﬁnition and the lower semiconti nuity of certain quasiconvex integrals

P. Marcellini, On the deﬁnition and the lower semiconti nuity of certain quasiconvex integrals. Ann. I. Poincaré section C, tome 3, nr. 5, 391-409, (1986)

work page 1986

[39] [39]

Marcellini, Regularity and existence of solutions o f elliptic equations with (p, q)-growth conditions

P. Marcellini, Regularity and existence of solutions o f elliptic equations with (p, q)-growth conditions. J. Diﬀerential Equations , 90, 1-30, (1991)

work page 1991

[40] [40]

Marcellini, Regularity for elliptic equations with general growth conditions

P. Marcellini, Regularity for elliptic equations with general growth conditions. J. Diﬀerential Equations , 105, 296-333, (1993)

work page 1993

[41] [41]

Marcellini, Regularity of minimizers of integrals o f the calculus of variations with non-standard growth conditions

P. Marcellini, Regularity of minimizers of integrals o f the calculus of variations with non-standard growth conditions. Arch. Rat. Mech. Anal. 105, 267-284, (1989)

work page 1989

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