Regular coverings and fundamental groupoids of Alexandroff spaces

Nicol\'as Cianci

arxiv: 1907.02624 · v1 · pith:ZJ63TR3Enew · submitted 2019-07-04 · 🧮 math.AT

Regular coverings and fundamental groupoids of Alexandroff spaces

Nicol\'as Cianci This is my paper

Pith reviewed 2026-05-25 08:19 UTC · model grok-4.3

classification 🧮 math.AT

keywords Alexandroff spacesfundamental groupoidregular coveringsspecialization preordercategory localizationthin categorytopological groupoids

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The pith

The fundamental groupoid of an Alexandroff space equals the localization of the thin category from its specialization preorder.

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

The paper shows that for any Alexandroff space the fundamental groupoid arises as the localization of a thin category built from the specialization preorder on the underlying set. This description holds without the local finiteness or T0 assumptions required in earlier work. A reader would care because it gives an algebraic-combinatorial model for the homotopy type of these spaces, which appear often in digital topology and combinatorial settings. The result also characterizes regular coverings via morphism-inverting functors from the space itself.

Core claim

The fundamental groupoid of an Alexandroff space X is naturally isomorphic to the localization, at its set of morphisms, of the thin category associated to the set X considered as a preordered set with the specialization preorder. Regular coverings of X are represented by certain morphism-inverting functors with domain X, extending earlier results for locally finite T0 spaces.

What carries the argument

Localization at all morphisms of the thin category coming from the specialization preorder on X.

If this is right

The fundamental groupoid computation reduces to a category localization operation on the preorder.
Regular coverings correspond to functors that invert all morphisms from the space category.
The result applies to all Alexandroff spaces rather than only the locally finite T0 subclass.
The homotopy data of the space is determined entirely by its specialization preorder.

Where Pith is reading between the lines

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

This description may make it easier to compute fundamental groupoids for infinite or non-T0 Alexandroff spaces.
It connects the topology of Alexandroff spaces directly to the theory of categories and their localizations.
One could test the isomorphism on concrete examples like infinite chains or non-Hausdorff spaces to verify the extension.

Load-bearing premise

The localization of the thin category from the specialization preorder recovers the fundamental groupoid for every Alexandroff space.

What would settle it

An Alexandroff space whose fundamental groupoid, computed from path homotopy classes, differs from the localization of its preorder thin category.

Figures

Figures reproduced from arXiv: 1907.02624 by Nicol\'as Cianci.

**Figure 1.** Figure 1: 3.2. Regular coverings of Alexandroff spaces. For every connected small category C , every object c0 ∈ Obj(C ) and every maximal tree T of C , we have a functor FT : C → π1(C , c0) induced by T which is the composition C ιC−→ LC qC −−→ LC /LT ∼=−→ π1(C , c0) (although FT depends on c0 as well as on T , we decided to leave the object c0 out of the notation for the sake of simplicity). Given a group homomor… view at source ↗

read the original abstract

We summarize several results about the regular coverings and the fundamental groupoids of Alexandroff spaces. In particular, we show that the fundamental groupoid of an Alexandroff space $X$ is naturally isomorphic to the localization, at its set of morphisms, of the thin category associated to the set $X$ considered as a preordered set with the specialization preorder. We also show that the regular coverings of an Alexandroff space $X$ are represented by certain morphism-inverting functors with domain $X$, extending a result of E. Minian and J. Barmak about the regular coverings of locally finite T$_0$ spaces.

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 extends Minian-Barmak to arbitrary Alexandroff spaces by identifying the fundamental groupoid with the localization of the thin specialization preorder category.

read the letter

The main point is that the paper drops the locally finite T0 restriction from the Minian-Barmak theorem and shows that for any Alexandroff space X the fundamental groupoid is naturally isomorphic to the localization at all morphisms of the thin category induced by the specialization preorder on X. It also gives a functorial representation of regular coverings by morphism-inverting functors out of that category. The stress-test note confirms the proofs are direct and use only the standard bijection between Alexandroff topologies and preorders, with no extra hypotheses required. That extension is the concrete new piece. The argument is clean because the thin category and its localization are defined in the obvious way from the preorder, and naturality follows from the correspondence. The covering representation is a reasonable categorical lift of the earlier result. Soft spots are minor and proportional. The work stays inside Alexandroff spaces, so its reach is limited to people already interested in digital topology or poset-like spaces; it does not reorganize broader algebraic topology. The abstract left the assumptions unclear, but the full argument resolves that by sticking to the preorder setup. No circularity or load-bearing gaps are indicated. This is for readers working on categorical models inside Alexandroff or preorder spaces. A serious referee should see it because the claim is explicit, the extension is verifiable, and the supporting note indicates the derivations are in place.

Referee Report

0 major / 2 minor

Summary. The paper establishes two main results on Alexandroff spaces: (1) the fundamental groupoid of an arbitrary Alexandroff space X is naturally isomorphic to the localization (at all morphisms) of the thin category induced by the specialization preorder on the underlying set X; (2) the regular coverings of X are represented by certain morphism-inverting functors out of the thin category associated to X. These extend the corresponding statements of Minian-Barmak, which required local finiteness and the T0 separation axiom.

Significance. If the isomorphism holds, the result supplies a purely categorical model for the fundamental groupoid of any Alexandroff space, removing the local-finiteness and T0 hypotheses of prior work. The construction uses only the standard correspondence between Alexandroff topologies and preorders, together with the universal property of localization, and therefore yields a parameter-free, functorial description that applies uniformly. The representation of regular coverings by inverting functors likewise extends without extra restrictions.

minor comments (2)

The abstract states the two theorems but the introduction could usefully include a one-sentence pointer to the precise location (e.g., Theorem 3.4 and Theorem 4.2) where each is proved.
Notation for the thin category associated to the preorder is introduced in §2 but never given an explicit symbol; a short displayed definition would improve readability when the localization functor is later invoked.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for their positive summary of our results and for recommending acceptance of the manuscript. The report accurately captures the two main contributions: the natural isomorphism between the fundamental groupoid of an arbitrary Alexandroff space and the localization of its thin specialization-preorder category, and the representation of regular coverings by morphism-inverting functors, both without the local-finiteness or T0 hypotheses required in prior work.

Circularity Check

0 steps flagged

No circularity; direct proof of isomorphism via standard preorder-topology correspondence

full rationale

The paper states and proves that the fundamental groupoid of an arbitrary Alexandroff space X is naturally isomorphic to the localization (at all morphisms) of the thin category induced by the specialization preorder on X. This is presented as an extension of the Minian-Barmak result (different authors) from locally finite T0 spaces to the general case. The construction uses the well-known equivalence between Alexandroff topologies and preorders, with the thin category and localization defined independently of the target isomorphism. No equations reduce the claimed result to a tautology, fitted parameter, or self-citation chain. The central claim has independent mathematical content and is not forced by definition or prior self-referential work.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review supplies no explicit free parameters, axioms, or invented entities; the central claims rest on standard definitions of Alexandroff spaces, specialization preorder, thin categories, and localization that are presumed known from prior literature.

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Forward citations

Cited by 1 Pith paper

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Reference graph

Works this paper leans on

20 extracted references · 20 canonical work pages · cited by 1 Pith paper · 2 internal anchors

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Diskrete R¨ aume.Mat

Alexandroff, P. Diskrete R¨ aume.Mat. Sb. 2 (1937), 501–518

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$G$-colorings of posets, coverings and presentations of the fundamental group

Barmak, J. A., and Minian, E. G. G-colorings of posets, coverings and presenta- tions of the fundamental group. arXiv preprint arXiv:1212.6442v2 (2014). Available at https://arxiv.org/pdf/1212.6442.pdf

work page internal anchor Pith review Pith/arXiv arXiv 2014
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Smallest homotopically trivial non-contractible spaces

Cianci, N., and Ottina, M. Smallest homotopically trivial non-contractible spaces. arXiv preprint arXiv:1608.05307 (2016). Available at https://arxiv.org/pdf/1608.05307

work page internal anchor Pith review Pith/arXiv arXiv 2016
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A new spectral sequence for homology of posets

Cianci, N., and Ottina, M. A new spectral sequence for homology of posets. Topology Appl. 217 (2017), 1–19

work page 2017
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Poset splitting and minimality of ﬁnite models

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work page 2018
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Homotopy theory of posets

Raptis, G. Homotopy theory of posets. Homol. Homotopy Appl. 12 , 2 (2010), 211–230

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Stong, R. E. Finite topological spaces. Trans. Amer. Math. Soc. 123 (1966), 325–340. F acultad de Ciencias Exactas y Naturales, Universidad Naciona l de Cuyo, Mendoza, Argentina. E-mail address : nicocian@gmail.com

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[1] [1]

Diskrete R¨ aume.Mat

Alexandroff, P. Diskrete R¨ aume.Mat. Sb. 2 (1937), 501–518

work page 1937

[2] [2]

Arenas, F. G. Alexandroﬀ spaces. Acta Math. Univ. Comenian. (N.S.) 68 , 1 (1999), 17–25

work page 1999

[3] [3]

$G$-colorings of posets, coverings and presentations of the fundamental group

Barmak, J. A., and Minian, E. G. G-colorings of posets, coverings and presenta- tions of the fundamental group. arXiv preprint arXiv:1212.6442v2 (2014). Available at https://arxiv.org/pdf/1212.6442.pdf

work page internal anchor Pith review Pith/arXiv arXiv 2014

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Cores of alexandroﬀ spaces

Chen, X. Cores of alexandroﬀ spaces. REU (2015). Available at http://math.uchicago.edu/~may/REUDOCS/Chen,Xi(Cathy).pdf

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Smallest homotopically trivial non-contractible spaces

Cianci, N., and Ottina, M. Smallest homotopically trivial non-contractible spaces. arXiv preprint arXiv:1608.05307 (2016). Available at https://arxiv.org/pdf/1608.05307

work page internal anchor Pith review Pith/arXiv arXiv 2016

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A new spectral sequence for homology of posets

Cianci, N., and Ottina, M. A new spectral sequence for homology of posets. Topology Appl. 217 (2017), 1–19

work page 2017

[7] [7]

Poset splitting and minimality of ﬁnite models

Cianci, N., and Ottina, M. Poset splitting and minimality of ﬁnite models. J. Combin. Theory Ser. A 157 (2018), 120–161

work page 2018

[8] [8]

Calculus of fractions and homotopy theory

Gabriel, P., and Zisman, M. Calculus of fractions and homotopy theory . Ergebnisse der Mathematik und ihrer Grenzgebiete, Band 35. Springer-Verl ag New York, Inc., New York, 1967

work page 1967

[9] [9]

G., and Jardine, J

Goerss, P. G., and Jardine, J. F. Simplicial homotopy theory . Modern Birkh¨ auser Classics. Birkh¨ auser Verlag, Basel, 2009. Reprint of the 1999 editio n [MR1711612]

work page 2009

[10] [10]

Algebraic topology

Hatcher, A. Algebraic topology. Cambridge University Press, Cambridge, 2002

work page 2002

[11] [11]

Higgins, P. J. Categories and groupoids. Repr. Theory Appl. Categ. , 7 (2005), 1–178. Reprint of the 1971 original [Notes on categories and groupoids, Van Nostrand Reinhold, London; MR0327946] with a new preface by the author

work page 2005

[12] [12]

J.On homotopy types of Alexandroﬀ spaces

Kukie/suppress la, M. J.On homotopy types of Alexandroﬀ spaces. Order 27 , 1 (2010), 9–21

work page 2010

[13] [13]

May, J. P. Finite topological spaces. Notes for REU (2003). Available at http://www.math.uchicago.edu/~ may/MISC/FiniteSpaces.pdf

work page 2003

[14] [14]

McCord, M. C. Singular homology groups and homotopy groups of ﬁnite topol ogical spaces. Duke Math. J. 33 (1966), 465–474

work page 1966

[15] [15]

The geometric realization of a semi-simplicial complex

Milnor, J. The geometric realization of a semi-simplicial complex. Ann. of Math. (2) 65 (1957), 357–362

work page 1957

[16] [16]

Higher algebraic K-theory

Quillen, D. Higher algebraic K-theory. I. 85–147. Lecture Notes in Math., Vol. 341

work page

[17] [17]

Homotopy theory of posets

Raptis, G. Homotopy theory of posets. Homol. Homotopy Appl. 12 , 2 (2010), 211–230

work page 2010

[18] [18]

Classifying spaces and spectral sequences

Segal, G. Classifying spaces and spectral sequences. Inst. Hautes ´Etudes Sci. Publ. Math. , 34 (1968), 105–112

work page 1968

[19] [19]

Spanier, E. H. Algebraic topology . Springer-Verlag, New York-Berlin, 1981. Reimpresi´ on corregida

work page 1981

[20] [20]

Stong, R. E. Finite topological spaces. Trans. Amer. Math. Soc. 123 (1966), 325–340. F acultad de Ciencias Exactas y Naturales, Universidad Naciona l de Cuyo, Mendoza, Argentina. E-mail address : nicocian@gmail.com

work page 1966