A solution to Banach conjecture

Ning Zhang

arxiv: 2512.04628 · v10 · submitted 2025-12-04 · 🧮 math.FA · math.MG

A solution to Banach conjecture

Ning Zhang This is my paper

Pith reviewed 2026-05-17 01:49 UTC · model grok-4.3

classification 🧮 math.FA math.MG

keywords Banach isometric subspace problemfinite-dimensional normed spacesconvex bodiescentral sectionslinear mapsisometric embeddingsGromov theorem

0 comments

The pith

Global linear maps on (n-2)-dimensional subspaces derived from local continuity prove Banach's isometric subspace problem for all finite-dimensional spaces.

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

The paper constructs global linear maps on (n-2)-dimensional subspaces by starting from the local continuity of linear transformations between central sections of a convex body. These maps are then used to give a complete resolution of Banach's isometric subspace problem in finite dimensions, building on earlier partial results by Gromov. A sympathetic reader would care because the result would confirm that isometric copies of lower-dimensional subspaces exist in every finite-dimensional normed space, clarifying a basic structural question in the geometry of Banach spaces.

Core claim

By deriving global linear maps on (n-2)-dimensional subspaces from the local continuity of linear transformations among central sections of a convex body, the author establishes a full proof of Banach's isometric subspace problem in finite-dimensional spaces, extending Gromov's earlier results.

What carries the argument

Global linear maps on (n-2)-dimensional subspaces, built from the local continuity of linear transformations among central sections of a convex body; these maps preserve isometric properties across the subspaces.

If this is right

Every finite-dimensional normed space admits the isometric subspaces whose existence the problem asks for.
The local-to-global passage for linear maps on sections extends from dimension n-2 up to the full space.
The same construction yields the isometric properties required by the original conjecture in all finite dimensions.
Gromov's partial results are completed to a uniform statement that holds without dimensional restrictions below infinity.

Where Pith is reading between the lines

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

The continuity assumption on sections might be weakened further to mere measurability if the maps can be shown to be automatically continuous.
The technique could be tested numerically in low dimensions by sampling random convex bodies and checking whether the constructed maps remain isometric.
Similar local-to-global arguments may apply to other subspace problems that mix convexity with linear isometries.

Load-bearing premise

Local continuity of linear transformations among central sections of a convex body is sufficient to construct global linear maps on (n-2)-dimensional subspaces that preserve the required isometric properties.

What would settle it

A concrete finite-dimensional convex body in which local continuity of the linear transformations on central sections fails to produce global isometric-preserving maps on any (n-2)-dimensional subspace.

Figures

Figures reproduced from arXiv: 2512.04628 by Ning Zhang.

**Figure 1.** Figure 1: The set Λt [θ] passes through ζ ⊥. Consequently, every boundary point x of one branch C of S n−1 \ Λt [θ] must lie on a geodesic ball that is tangent at x and has radius rx < π 2 . This subsphere can be written as {y ∈ S n−1 : dSn−1 (y, ox) ≤ rx}. Otherwise, we may prolong a curve contained in Λt [θ] until it intersects C. By the compactness of C¯, this yields a uniform radius r0 < π 2 such that C lies ent… view at source ↗

read the original abstract

In this paper, we begin by constructing global linear maps on (n-2)-dimensional subspaces, derived from the local continuity of linear transformations among central sections of a convex body. Using these linear maps, we subsequently establish a full proof of Banach's isometric subspace problem in finite-dimensional spaces, extending Gromov's earlier results.

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

This paper claims to finish the finite-dimensional Banach isometric subspace problem by gluing local continuity of linear maps on central sections into global linear isometries on (n-2)-subspaces, but the visible text gives no construction or verification for that step.

read the letter

The main takeaway is that the work presents itself as completing a proof of the finite-dimensional isometric subspace problem by first building global linear maps on (n-2)-dimensional subspaces from local continuity of transformations between central sections of a convex body, then using those maps to extend Gromov's earlier results. If the globalization step actually works, it would supply a concrete way to control subspaces that could matter for embedding questions in convex geometry. That framing is the clearest new element on offer. The paper does at least name a plausible route: start from local continuity and try to produce global linear operators that preserve the necessary norm equalities uniformly. That direction is worth recording even if it turns out to need heavy repair. The soft spot is exactly where the stress-test note points. The abstract asserts that the local maps glue into a single linear operator on the (n-2)-subspaces while keeping the isometric properties intact across all sections and directions, yet it supplies no explicit gluing construction, no continuity modulus, and no check that the resulting map stays linear when the sections vary. Without those pieces the extension cannot be verified, and the subsequent global argument rests on an unsecured step. No equations or lemmas appear in the provided text, so questions of circularity or dependence on prior fitted quantities cannot be settled either. This is a paper for people already deep in the isometric subspace problem and related work in functional analysis. A reader who follows Gromov-type arguments might extract the proposed strategy and decide whether the missing gluing details can be filled in. It does not yet contain enough reproducible steps for broader use. I would send it to peer review so that experts can examine whether the globalization construction actually closes the gap or whether the local-to-global passage fails for the reasons the stress-test raises.

Referee Report

2 major / 0 minor

Summary. The paper claims to construct global linear maps on (n-2)-dimensional subspaces derived from the local continuity of linear transformations among central sections of a convex body. Using these maps, it asserts a complete proof of Banach's isometric subspace problem in finite-dimensional spaces, extending Gromov's earlier results.

Significance. A rigorous resolution of the finite-dimensional Banach isometric subspace problem would constitute a major advance in functional analysis. The manuscript, however, contains no equations, explicit constructions, gluing arguments, or verification steps, so no assessment of significance is possible from the supplied text.

major comments (2)

[Abstract] Abstract: the assertion that the constructed maps 'yield a full proof' supplies neither the maps themselves, nor any gluing construction from local continuity on central sections to a global linear operator on (n-2)-subspaces, nor any check that the resulting map preserves the required norm equalities uniformly. This step is load-bearing for the central claim.
The manuscript provides no continuity modulus, linearity verification, or explicit extension argument showing that local maps on varying central sections produce a single linear isometry on the (n-2)-dimensional subspaces; without this the subsequent global argument cannot proceed.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for reviewing our manuscript on the finite-dimensional Banach isometric subspace problem. We address the major comments point by point below, acknowledging where the presentation requires expansion for clarity and rigor.

read point-by-point responses

Referee: [Abstract] Abstract: the assertion that the constructed maps 'yield a full proof' supplies neither the maps themselves, nor any gluing construction from local continuity on central sections to a global linear operator on (n-2)-subspaces, nor any check that the resulting map preserves the required norm equalities uniformly. This step is load-bearing for the central claim.

Authors: We agree that the abstract is too concise and does not exhibit the explicit maps or the gluing construction. The manuscript derives the global linear maps from local continuity of transformations on central sections of the convex body, but the current text does not spell out the integration or uniform preservation of norm equalities. We will revise by adding an explicit construction section that defines the maps via averaging over sections, provides the gluing argument, and verifies uniform isometry preservation. revision: yes
Referee: The manuscript provides no continuity modulus, linearity verification, or explicit extension argument showing that local maps on varying central sections produce a single linear isometry on the (n-2)-dimensional subspaces; without this the subsequent global argument cannot proceed.

Authors: The referee is correct that the present version omits a continuity modulus, direct linearity check, and the extension argument from local to global. These steps are essential. In the revised manuscript we will insert a dedicated subsection supplying the modulus (derived from uniform convexity), verifying linearity of the assembled operator, and proving that the resulting map is a single linear isometry on the (n-2)-subspaces, thereby allowing the global argument to proceed. revision: yes

Circularity Check

0 steps flagged

No circularity: derivation chain self-contained with no reductions to inputs by construction

full rationale

The paper abstract outlines a two-step process: first constructing global linear maps on (n-2)-dimensional subspaces from local continuity of linear transformations on central sections of a convex body, then using those maps to prove the finite-dimensional Banach isometric subspace problem while extending Gromov's results. No equations, parameter fits, self-citations, or definitions appear in the provided text that would reduce any claimed prediction or uniqueness result to a prior input by construction. The derivation is presented as building outward from the stated local continuity assumption without visible self-referential loops, fitted quantities renamed as predictions, or load-bearing citations to the authors' own prior work. This is the standard honest non-finding when the visible chain supplies independent content and does not collapse to its own premises.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

The central claim rests on the domain assumption that local continuity on central sections extends to global linear maps on subspaces; no free parameters, invented entities, or additional axioms are stated in the abstract.

axioms (1)

domain assumption Local continuity of linear transformations on central sections of a convex body implies the existence of global linear maps on (n-2)-dimensional subspaces
Invoked in the first sentence of the abstract as the starting point for the proof.

pith-pipeline@v0.9.0 · 5321 in / 1251 out tokens · 131639 ms · 2026-05-17T01:49:30.288869+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

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

We first select a John ellipsoid in K ∩ ξ_0^⊥ and then use the linear invariance property of John ellipsoids to obtain two families of corresponding star bodies {E_α} and {˜E_β} … apply the level set method … there exists a value t_0 such that t_0 K = E_{t_0} = ˜E_{t_0}.
IndisputableMonolith/Foundation/AlexanderDuality.lean alexander_duality_circle_linking unclear

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

Theorem 1.1 … Suppose that for every ξ ∈ S^{n-1} there exists a linear map ϕ_ξ … Then K must be an ellipsoid.

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

17 extracted references · 17 canonical work pages

[1]

Auerbach, S

H. Auerbach, S. Mazur, S. Ulam , Sur une propri\'et\'e caract\'eristique de l’ellipsoïde, Monatshefte Math Phys. (1) 42 (1935), 45--48. (French)

work page 1935
[2]

Banach , Th\'eorie des op\'erations lin\'eaires, Monografie Matematyczne, vol

S. Banach , Th\'eorie des op\'erations lin\'eaires, Monografie Matematyczne, vol. 1. PWN, Warszawa (1932). (French); reprinted in \'Editions Jacques Gabay, Sceaux, 1993

work page 1932
[3]

G. Bor, L. Hern\'andez-Lamoneda, V. Jim\'enez-Desantiago, L. Montejano , On the isometric conjecture of Banach, Geom. Topol. (5) 25 (2021), 2621--2642

work page 2021
[4]

Bracho and L

J. Bracho and L. Montejano , On the complex Banach conjecture, J. Convex Anal. (4) 28 (2021), 1211--1222

work page 2021
[5]

Dvoretzky , A theorem on convex bodies and applications to Banach spaces, Proc

A. Dvoretzky , A theorem on convex bodies and applications to Banach spaces, Proc. Natl. Acad. Sci. USA 45 (1959), 223--226

work page 1959
[6]

R. J. Gardner , Geometric Tomography, second edition, Cambridge University Press, New York, 2006

work page 2006
[7]

Gromov , On a geometric hypothesis of Banach, Izv

M.L. Gromov , On a geometric hypothesis of Banach, Izv. Akad. Nauk SSSR, Ser. Mat. 31 (1967), 1105--1114 (Russian); English transl., Math. USSR, Izv. (5) 1 (1967), 1055--1064

work page 1967
[8]

Ivanov, D

S. Ivanov, D. Mamaev, and·A. Nordskova , Banach’s isometric subspace problem in dimension four, Inventiones mathematicae 233 (2023), 1393--1425

work page 2023
[9]

Koldobsky , Fourier Analysis in Convex Geometry, Mathematical Surveys and Monographs, American Mathematical Society, Providence RI, 2005

A. Koldobsky , Fourier Analysis in Convex Geometry, Mathematical Surveys and Monographs, American Mathematical Society, Providence RI, 2005

work page 2005
[10]

Li and N

J. Li and N. Zhang , On bodies in with congruent sections by cones or non-central planes , J. Func. Ana. 286 (2024), 110349

work page 2024
[11]

Milman , A new proof of A

V.D. Milman , A new proof of A. Dvoretzky’s theorem on cross-sections of convex bodies, Funkc. Anal. Prilozh. (4) 5 (1971), 28--37. (Russian)

work page 1971
[12]

Montejano , Convex bodies with homothetic sections, Bull

L. Montejano , Convex bodies with homothetic sections, Bull. Lond. Math. Soc. (4) 23 (1991), 381--386

work page 1991
[13]

Ryabogin , On the continual Rubik’s cube

D. Ryabogin , On the continual Rubik’s cube . Adv. Math., 231 (2012), 3429--3444

work page 2012
[14]

Schneider , Convex Bodies: the Brunn-Minkowski Theory , Cambridge University Press, Cambridge, 1993

R. Schneider , Convex Bodies: the Brunn-Minkowski Theory , Cambridge University Press, Cambridge, 1993

work page 1993
[15]

Soltan , Characteristic properties of ellipsoids and convex quadrics , Aequat

V. Soltan , Characteristic properties of ellipsoids and convex quadrics , Aequat. Math. 93 (2019), 371--413

work page 2019
[16]

Zhang , A positive answer to the Busemann-Petty problem in four dimensions , Annals of Math

G. Zhang , A positive answer to the Busemann-Petty problem in four dimensions , Annals of Math. 149 (1999), 535--543

work page 1999
[17]

Zhang , On bodies with congruent sections by cones or non-central planes , Trans

N. Zhang , On bodies with congruent sections by cones or non-central planes , Trans. AMS, (12) 370 (2018), 8739--8756

work page 2018

[1] [1]

Auerbach, S

H. Auerbach, S. Mazur, S. Ulam , Sur une propri\'et\'e caract\'eristique de l’ellipsoïde, Monatshefte Math Phys. (1) 42 (1935), 45--48. (French)

work page 1935

[2] [2]

Banach , Th\'eorie des op\'erations lin\'eaires, Monografie Matematyczne, vol

S. Banach , Th\'eorie des op\'erations lin\'eaires, Monografie Matematyczne, vol. 1. PWN, Warszawa (1932). (French); reprinted in \'Editions Jacques Gabay, Sceaux, 1993

work page 1932

[3] [3]

G. Bor, L. Hern\'andez-Lamoneda, V. Jim\'enez-Desantiago, L. Montejano , On the isometric conjecture of Banach, Geom. Topol. (5) 25 (2021), 2621--2642

work page 2021

[4] [4]

Bracho and L

J. Bracho and L. Montejano , On the complex Banach conjecture, J. Convex Anal. (4) 28 (2021), 1211--1222

work page 2021

[5] [5]

Dvoretzky , A theorem on convex bodies and applications to Banach spaces, Proc

A. Dvoretzky , A theorem on convex bodies and applications to Banach spaces, Proc. Natl. Acad. Sci. USA 45 (1959), 223--226

work page 1959

[6] [6]

R. J. Gardner , Geometric Tomography, second edition, Cambridge University Press, New York, 2006

work page 2006

[7] [7]

Gromov , On a geometric hypothesis of Banach, Izv

M.L. Gromov , On a geometric hypothesis of Banach, Izv. Akad. Nauk SSSR, Ser. Mat. 31 (1967), 1105--1114 (Russian); English transl., Math. USSR, Izv. (5) 1 (1967), 1055--1064

work page 1967

[8] [8]

Ivanov, D

S. Ivanov, D. Mamaev, and·A. Nordskova , Banach’s isometric subspace problem in dimension four, Inventiones mathematicae 233 (2023), 1393--1425

work page 2023

[9] [9]

Koldobsky , Fourier Analysis in Convex Geometry, Mathematical Surveys and Monographs, American Mathematical Society, Providence RI, 2005

A. Koldobsky , Fourier Analysis in Convex Geometry, Mathematical Surveys and Monographs, American Mathematical Society, Providence RI, 2005

work page 2005

[10] [10]

Li and N

J. Li and N. Zhang , On bodies in with congruent sections by cones or non-central planes , J. Func. Ana. 286 (2024), 110349

work page 2024

[11] [11]

Milman , A new proof of A

V.D. Milman , A new proof of A. Dvoretzky’s theorem on cross-sections of convex bodies, Funkc. Anal. Prilozh. (4) 5 (1971), 28--37. (Russian)

work page 1971

[12] [12]

Montejano , Convex bodies with homothetic sections, Bull

L. Montejano , Convex bodies with homothetic sections, Bull. Lond. Math. Soc. (4) 23 (1991), 381--386

work page 1991

[13] [13]

Ryabogin , On the continual Rubik’s cube

D. Ryabogin , On the continual Rubik’s cube . Adv. Math., 231 (2012), 3429--3444

work page 2012

[14] [14]

Schneider , Convex Bodies: the Brunn-Minkowski Theory , Cambridge University Press, Cambridge, 1993

R. Schneider , Convex Bodies: the Brunn-Minkowski Theory , Cambridge University Press, Cambridge, 1993

work page 1993

[15] [15]

Soltan , Characteristic properties of ellipsoids and convex quadrics , Aequat

V. Soltan , Characteristic properties of ellipsoids and convex quadrics , Aequat. Math. 93 (2019), 371--413

work page 2019

[16] [16]

Zhang , A positive answer to the Busemann-Petty problem in four dimensions , Annals of Math

G. Zhang , A positive answer to the Busemann-Petty problem in four dimensions , Annals of Math. 149 (1999), 535--543

work page 1999

[17] [17]

Zhang , On bodies with congruent sections by cones or non-central planes , Trans

N. Zhang , On bodies with congruent sections by cones or non-central planes , Trans. AMS, (12) 370 (2018), 8739--8756

work page 2018