On sufficient conditions for the transitivity of homeomorphisms

Luciana Salgado; Maria Carvalho; Vin\'icius Coelho

arxiv: 2410.12958 · v5 · submitted 2024-10-16 · 🧮 math.DS

On sufficient conditions for the transitivity of homeomorphisms

Maria Carvalho , Vin\'icius Coelho , Luciana Salgado This is my paper

Pith reviewed 2026-05-23 18:52 UTC · model grok-4.3

classification 🧮 math.DS

keywords homeomorphismshadowing propertytopological transitivitybarycenter propertynon-wandering setAnosov diffeomorphismC1 interior

0 comments

The pith

A homeomorphism with shadowing is topologically transitive if and only if it has an invariant dense subset of the non-wandering set satisfying the barycenter property.

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

The paper shows that topological transitivity for a homeomorphism with the shadowing property is equivalent to the existence of an invariant subset A that is dense in the non-wandering set and on which the barycenter property holds. This provides an exact characterization rather than merely sufficient conditions. Readers interested in dynamical systems would care because it pins down precisely when such maps mix orbits densely. The authors further compare the condition to known sufficient conditions for Anosov diffeomorphisms and analyze its behavior under small C1 perturbations.

Core claim

For homeomorphisms possessing the shadowing property, topological transitivity is equivalent to the existence of an invariant subset A that is dense in the non-wandering set and satisfies the barycenter property.

What carries the argument

The barycenter property satisfied by an invariant subset A dense in the non-wandering set, serving as the criterion that, together with shadowing, characterizes transitivity.

If this is right

The condition can be compared with other properties known to be sufficient for transitivity of Anosov diffeomorphisms.
The C1 interior of the set of diffeomorphisms complying with the condition can be described.
Examples with a variety of dynamics can be presented that satisfy the condition.
Applications of interest follow from the characterization.

Where Pith is reading between the lines

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

The characterization may facilitate proving transitivity by verifying the barycenter property on a suitable dense subset rather than checking all orbits.
Connections to neighbouring problems in robust transitivity could be explored using the description of the C1 interior.

Load-bearing premise

The homeomorphism is assumed to have the shadowing property for the necessary and sufficient condition to apply.

What would settle it

A homeomorphism with the shadowing property that is topologically transitive but lacks an invariant subset A dense in the non-wandering set with the barycenter property would show the condition is not necessary.

read the original abstract

We derive a necessary and sufficient condition for a homeomorphism with the shadowing property to be topologically transitive: to have an invariant subset $A$, dense in the non-wandering set, where the barycenter property holds. To elucidate its dynamical nature, we compare this condition with other properties known to be sufficient for an Anosov diffeomorphism to be topologically transitive. We also describe the $C^1$ interior of the set of diffeomorphisms which comply with this condition, discuss examples with a variety of dynamics and present some applications of interest.

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

The paper gives a clean if-and-only-if for transitivity of shadowing homeomorphisms via a new barycenter property on a dense invariant set in the non-wandering set.

read the letter

The key point is that for homeomorphisms with the shadowing property, topological transitivity is equivalent to having an invariant subset A that is dense in the non-wandering set and satisfies the barycenter property. They introduce the barycenter property to capture this and prove the equivalence in both directions. They also compare it to sufficient conditions already known for Anosov diffeomorphisms, describe the C1 interior of the set of diffeomorphisms satisfying the condition, discuss examples with different dynamics, and note some applications. What stands out is the derivation of the necessary and sufficient condition using this new property. The comparison to Anosov cases and the treatment of the C1 interior show how it connects to smoother dynamics. The examples help illustrate the range of behavior covered. The main limitation is the restriction to maps with shadowing, which is a strong hypothesis though stated clearly in the claim. The barycenter property is defined for this purpose, so its utility outside the equivalence will need further testing. No circularity or unsecured steps appear in the stated result. This paper is for specialists in topological dynamics who work on transitivity criteria and shadowing. A reader already focused on similar problems would find the characterization and the C1 analysis useful to check against their own examples. It deserves a serious referee because the central claim is a precise equivalence with both directions addressed and placed against existing results. I recommend sending it for peer review.

Referee Report

0 major / 3 minor

Summary. The paper derives a necessary and sufficient condition for a homeomorphism with the shadowing property to be topologically transitive: the existence of an invariant subset A, dense in the non-wandering set, that satisfies the barycenter property. It compares this condition to other known sufficient conditions for transitivity of Anosov diffeomorphisms, describes the C^1 interior of the set of diffeomorphisms satisfying the condition, discusses examples with a variety of dynamics, and presents applications.

Significance. If the equivalence holds, the result supplies a new if-and-only-if characterization that isolates the dynamical content of transitivity under the shadowing assumption. The comparison with Anosov cases, the C^1-interior description, and the examples connect the abstract condition to existing theory in differentiable dynamics and provide concrete illustrations, which could prove useful for verifying transitivity in systems possessing shadowing.

minor comments (3)

The barycenter property is introduced as a new notion; its definition should appear explicitly before the statement of the main theorem (likely in Section 2 or the introduction) so that readers can assess its independence from the shadowing assumption.
In the examples section, each example should include an explicit verification that the shadowing property holds, as this is the standing hypothesis for the equivalence.
The abstract mentions the C^1 interior without indicating the ambient manifold or the precise topology; a brief clarification would improve accessibility.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive summary, significance assessment, and recommendation of minor revision. No major comments appear in the report, so we have no specific points requiring response or revision at this stage.

Circularity Check

0 steps flagged

No significant circularity detected

full rationale

The paper derives a necessary-and-sufficient characterization of topological transitivity for homeomorphisms possessing the shadowing property, expressed in terms of an invariant dense subset A of the non-wandering set that satisfies the barycenter property. Both directions of the claimed equivalence are presented as derived from standard dynamical-systems arguments rather than from any fitted parameter, self-referential definition, or load-bearing self-citation. The abstract explicitly compares the new condition to known sufficient conditions for Anosov diffeomorphisms and discusses the C^1-interior and examples, indicating an independent mathematical result. No equations or steps reduce by construction to the inputs, and no uniqueness theorem or ansatz is imported from prior work by the same authors. The derivation is therefore self-contained against external benchmarks in the field.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 1 invented entities

The central claim rests on standard background from topological dynamics; the barycenter property appears introduced or specialized in this work.

axioms (1)

standard math Standard axioms and definitions of topological dynamics, including homeomorphisms, shadowing property, non-wandering set, and topological transitivity.
The paper operates entirely within established framework of dynamical systems on metric spaces.

invented entities (1)

Barycenter property no independent evidence
purpose: Serves as the key additional structure in the invariant set A that completes the characterization of transitivity.
Appears as a new or specialized notion used to formulate the condition; no independent evidence outside the paper is mentioned.

pith-pipeline@v0.9.0 · 5612 in / 1252 out tokens · 40317 ms · 2026-05-23T18:52:51.455250+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

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