Dynamical Mordell-Lang problem for automorphisms of surfaces in positive characteristic
Pith reviewed 2026-05-22 22:15 UTC · model grok-4.3
The pith
The dynamical Mordell-Lang problem holds for automorphisms of projective surfaces in positive characteristic.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
The authors solve the dynamical Mordell-Lang problem in positive characteristic for automorphisms of projective surfaces, establishing the expected algebraic structure on the set of points whose forward orbits meet a given subvariety in infinitely many points.
What carries the argument
The dynamical Mordell-Lang problem, which asks for a description of points with infinite orbit-subvariety intersections under iteration of the automorphism.
If this is right
- The intersections of orbits with subvarieties admit a finite union decomposition into periodic components and structured cosets.
- The result applies to every projective surface, not merely special classes such as rational or K3 surfaces.
- Statements about orbit finiteness or density can now be made uniformly across all characteristics for this setting.
Where Pith is reading between the lines
- This surface case may serve as a stepping stone toward the problem for threefolds or for non-invertible maps.
- Positive characteristic introduces no extra obstructions beyond those already present in characteristic zero for surface automorphisms.
- Similar techniques could be tested on other classes of varieties where the automorphism group is large.
Load-bearing premise
The maps considered are automorphisms, which are invertible, rather than arbitrary endomorphisms of the surfaces.
What would settle it
An explicit automorphism of a projective surface over a field of positive characteristic together with a subvariety whose set of points with infinite orbit intersections fails to be a finite union of periodic orbits and cosets of algebraic subgroups would falsify the claimed solution.
read the original abstract
We solve the dynamical Mordell-Lang problem in positive characteristic for automorphisms of projective surfaces.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript consists solely of a title and the one-sentence abstract claiming to solve the dynamical Mordell-Lang problem in positive characteristic for automorphisms of projective surfaces. No proof outline, reduction steps, invocation of prior results, or technical arguments appear in the supplied text.
Significance. A correct solution to the dynamical Mordell-Lang problem for this class of maps would constitute a substantial advance in arithmetic dynamics over fields of positive characteristic, where inseparability and orbit-density phenomena differ from characteristic zero. The manuscript supplies no evidence that such a solution has been obtained.
major comments (1)
- The manuscript contains no sections, equations, or arguments whatsoever. The central claim that the dynamical Mordell-Lang problem is solved therefore cannot be verified or falsified on the basis of the provided text.
Simulated Author's Rebuttal
We thank the referee for their report. We acknowledge that the text supplied for review consists only of the title and abstract, which prevents verification of the central claim.
read point-by-point responses
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Referee: The manuscript contains no sections, equations, or arguments whatsoever. The central claim that the dynamical Mordell-Lang problem is solved therefore cannot be verified or falsified on the basis of the provided text.
Authors: We agree that the supplied text lacks any proof, reduction steps, or technical arguments, making the claim unverifiable from what was provided. This appears to be an error in the submission; the complete manuscript containing the solution is on arXiv:2504.02295. We will revise the submission to include the full text and proof. revision: yes
Circularity Check
No derivation chain or equations supplied; honest non-finding
full rationale
The provided document contains only the title and a single-sentence abstract stating that the dynamical Mordell-Lang problem is solved for automorphisms of projective surfaces in positive characteristic. No proof outline, equations, parameter fits, self-citations, uniqueness theorems, or ansatzes appear. Without any load-bearing steps visible in the text, none of the enumerated circularity patterns can be exhibited by direct quotation and reduction. This is the expected outcome when a paper's central claim is presented without an inspectable derivation.
discussion (0)
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