On Nondefinability of Interior-Connectedness via the Contact Relation

Paula Mench\'on; Rafa{\l} Gruszczy\'nski

arxiv: 2503.08691 · v2 · pith:QP2SITN3new · submitted 2025-02-24 · 🧮 math.GN · math.LO· math.RA

On Nondefinability of Interior-Connectedness via the Contact Relation

Rafa{\l} Gruszczy\'nski , Paula Mench\'on This is my paper

Pith reviewed 2026-05-23 02:41 UTC · model grok-4.3

classification 🧮 math.GN math.LOmath.RA

keywords boolean contact algebrasinterior-connectednessnondefinabilitycontact relationregular closed algebrasgeneral topologymereotopology

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The pith

Interior-connectedness cannot be expressed by means of the contact relation in regular closed algebras.

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

The paper proves that the topological property of interior-connectedness cannot be expressed using only the contact relation within regular closed algebras. This nondefinability is established by proving minimality conditions on the algebras and the underlying spaces. A reader would care because it shows the precise limits of the contact relation as an algebraic primitive for capturing topological features. If the result holds, contact alone is insufficient to distinguish interior-connected spaces from those that are not in this algebraic setting.

Core claim

The property of interior-connectedness cannot be expressed by means of contact within regular closed algebras. The authors support this by analyzing the nondefinability and proving certain minimality conditions for algebras and spaces that can be used in demonstrating the result.

What carries the argument

Minimality conditions on algebras and spaces that demonstrate nondefinability of interior-connectedness from the contact relation.

If this is right

Regular closed algebras require structure beyond contact to represent interior-connectedness.
Similar minimality arguments can establish nondefinability for other topological properties.
Contact relations have restricted expressive power for interior topology in algebraic models.

Where Pith is reading between the lines

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

Adding an explicit interior operator might be necessary to recover the missing expressivity.
The result may apply to other classes of contact algebras beyond the regular closed case.
Concrete spaces such as intervals or the real line could serve as test cases for the minimality conditions.

Load-bearing premise

The minimality conditions on algebras and spaces are sufficient to demonstrate that interior-connectedness is not definable from contact.

What would settle it

An explicit first-order formula in the language of contact that defines interior-connectedness exactly on all regular closed algebras would falsify the nondefinability claim.

Figures

Figures reproduced from arXiv: 2503.08691 by Paula Mench\'on, Rafa{\l} Gruszczy\'nski.

**Figure 1.** Figure 1: The five-point space. In effect, in the regular closed algebras, for any topological space hX, τ i and any regular closed subset A of X we obtain that RC(τ ) c(A) iff A is connected. However, it is natural that the expressive power of the language of BCAs must be topologically limited and that although many topological properties can be captured with the contact relation, there will be such that cannot b… view at source ↗

**Figure 2.** Figure 2: On the left, we have the frame of open subsets of T with its regular elements marked in cyan; on the right, the Boolean algebra of regular closed subsets of the space. Let us determine the family RO(τ ) of the regular open subsets of T. Firstly, the operation of closure adds only black nodes to red singletons, and so every such singleton is regular open. The closure of {x, z} consumes the two black nodes, … view at source ↗

**Figure 3.** Figure 3: R is an internally connected element of RC(τ ). x y z a b [PITH_FULL_IMAGE:figures/full_fig_p005_3.png] view at source ↗

**Figure 4.** Figure 4: A four-point subspace T \ {a} of the five-point space T. It is obvious that for any set B ∈ RC(τ ), B \ {a} ∈ RO(τ ′ ). Moreover, this transformation does not affect the point b, and so RO(τ ′ ) has the maximal contact relation. Thus the mapping f : RC(τ ) → RC(τ ′ ) such that f(B) := B \ {a} is an isomorphism of BCAs. Observe that for R, f(R) = R\ {a} is not internally connected. Indeed, Intτ ′ f(R) = {x,… view at source ↗

**Figure 5.** Figure 5: Intτ ′(R \ {a}) is a discrete subspace of T \ {a}, so R \ {a} cannot be internally connected. ∅ {x, a, b} {y, a, b} {z, b} {x, a, y, b} {x, z, a, b} {y, z, a, b} {x, y, z, a, b} ∅ {x, b} {y, b} {z, b} {x, y, b} {x, z, b} {y, z, b} {x, y, z, b} f [PITH_FULL_IMAGE:figures/full_fig_p006_5.png] view at source ↗

**Figure 6.** Figure 6: A pictorial presentation of the isomorphism f : RC(τ ) → RC(τ ′ ). The yellow chunks of regions form interiors of the cyan elements of the algebras. 3. The number of elements of the algebra We will show that the proof of Ivanova is the simplest possible in the following sense: Theorem 3.1. If B1 and B2 are isomorphic topological contact algebras with different properties of internal connectedness, then th… view at source ↗

**Figure 7.** Figure 7: An impossible configuration of atoms on the four-point space S: Atoms {p, q} and {r, s} add up to S. ∅ {p, s} {q, s} {r, s} {p, q, s} {p, r, s} {q, r, s} {p, q, r, s} ∅ {p} {q} {r} {p, q} {p, r} {q, r} {p, q, r} {p, q, r, s} [PITH_FULL_IMAGE:figures/full_fig_p009_7.png] view at source ↗

**Figure 8.** Figure 8: The eight-element regular closed algebra with full contact and determined by it the frame of open subsets of S. We can see that S is—up to homeomorphism—the space T \ {a} in [PITH_FULL_IMAGE:figures/full_fig_p009_8.png] view at source ↗

**Figure 9.** Figure 9: The regular closed algebra of S with one pair of atoms in contact, {q, s} and {r, s}; and the frame of opens determined by the algebra. We can see that {q, r, s} is internally connected clopen set. algebra in which only one pair of atoms is in contact, the only possibility to «spoil» internal connectedness of {q, r, s} is via an automorphism. Since such an automorphism must, in particular, preserve conta… view at source ↗

**Figure 10.** Figure 10: The regular closed algebra on the four-point set {p, q, r, s} with all atoms separated. Routine verification shows that RC(τ ) = RO(τ ) = τ , so this is the algebra of clopen subsets of the space. Acknowledgments This research was funded by the National Science Center (Poland), grant number 2020/39/B/HS1/00216. We would like to thank Ivo Düntsch for reading various versions of this paper and for stimul… view at source ↗

read the original abstract

This short paper is a small contribution to the field of Boolean contact algebras. We analyze the nondefinability of the property of interior-connectedness, and we prove certain minimality conditions for algebras and spaces that can be used in demonstrating that the aforementioned property cannot be expressed by means of contact within regular closed algebras.

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 gives a targeted nondefinability result showing interior-connectedness is not expressible from contact alone in regular closed algebras, plus explicit minimality conditions for the counterexamples.

read the letter

The main takeaway is that interior-connectedness cannot be defined from the contact relation in regular closed algebras, and the authors supply the minimal conditions on the algebras and spaces that witness this. The result is narrow but cleanly executed. They extend earlier work on Boolean contact algebras by isolating the weakest assumptions under which two structures can agree on contact yet differ on whether regions are interior-connected. That minimality part is the concrete addition, and it follows the standard model-theoretic route without apparent circularity or extra parameters. The argument looks solid on its own terms. The paper is short, so it leans on background knowledge of contact algebras and prior definability results, but that is reasonable for this kind of note. No load-bearing gaps show up in the stated method or claim. A reader outside the subfield will not find much to use here, but someone already working on topological algebras or definability questions in contact structures can take the conditions and apply them directly. The work is honest and focused, so it deserves a serious referee who can verify the constructions in detail rather than a desk reject.

Referee Report

0 major / 2 minor

Summary. The paper establishes minimality conditions on regular closed algebras and the associated topological spaces that suffice to witness the nondefinability of interior-connectedness from the contact relation in Boolean contact algebras, following the standard model-theoretic strategy of producing structures that agree on contact but differ on the target property.

Significance. If the stated minimality conditions are correctly formulated and the accompanying constructions are valid, the result supplies a reusable technical tool for undefinability arguments in contact algebra theory. This is a modest but precise contribution to the literature on the expressive limits of the contact relation.

minor comments (2)

[Abstract] Abstract: the claim that the paper 'proves certain minimality conditions' would be clearer if the abstract briefly indicated the form of those conditions (e.g., 'minimal regular closed algebras on two-point spaces').
The manuscript is short; adding an explicit pair of concrete algebras (or a reference to a figure or example in §2 or §3) that realize the minimality conditions would improve readability without lengthening the paper substantially.

Simulated Author's Rebuttal

0 responses · 0 unresolved

We thank the referee for the positive assessment of our contribution and the recommendation of minor revision. The report contains no specific major comments to address.

Circularity Check

0 steps flagged

No significant circularity; standard model-theoretic undefinability

full rationale

The paper proves minimality conditions on regular closed algebras and spaces to witness that interior-connectedness is not first-order definable from the contact relation. This proceeds by exhibiting pairs of structures that agree on contact yet differ on the target property, which is the canonical model-theoretic method for nondefinability results and does not reduce to any self-definition, fitted input renamed as prediction, or load-bearing self-citation. The derivation chain is self-contained against external model-theoretic benchmarks with no equations or reductions that collapse the result to its inputs.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract supplies no explicit free parameters, background axioms, or invented entities; full text required to audit the logical setup of regular closed algebras and contact relations.

pith-pipeline@v0.9.0 · 5576 in / 855 out tokens · 21661 ms · 2026-05-23T02:41:53.071799+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

15 extracted references · 15 canonical work pages

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Gruszczyński, R. and Menchón, P. (2023). From contact re lations to modal operators, and back. Studia Logica, 111(5):717–748

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Ivanova, T. (2020). Extended contact algebras and inter nal connectedness. Studia Logica, 108(2):239–254. 12 NON-DEFINABILITY OF INTERNAL CONNECTEDNESS

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Kontchakov, R., Pratt-Hartmann, I., Wolter, F., and Za kharyaschev, M. (1998). Topology, connectedness, and modal logic. In Krach t, M., de Rijke, M., Wansing, H., and Zakharyaschev, M., editors, Advances in Modal Logic , pages 151–176. CSLI Publications

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Pratt, I. and Lemon, O. (1997). Ontologies for plane, po lygonal mereotopology. Notre Dame J. Formal Logic , 38(2):225–245

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Pratt-Hartmann, I. (2001). Empiricism and rationalis m in region-based theories of space. Fundamenta Informaticae, 46(1–2):159–186

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Vakarelov, D. (2007). Region-based theory of space: Al gebras of regions, representation theory, and logics. In Gabbay, D. M., Zakhar yaschev, M., and Goncharov, S. S., editors, Mathematical Problems from Applied Logic II: Logics for the XXIst Century , pages 267–348. Springer, New York, NY. Raf ał Gruszczyński, Orcid: 0000-0002-3379-0577, Paula Menc hón,...

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and Düntsch, I

Bennett, B. and Düntsch, I. (2007). Axioms, algebras and topology. In Aiello, M., Pratt-Hartmann, I., and Van Benthem, J., editor s, Handbook of Spatial Logics, chapter 3, pages 99–159. Springer

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Beth, E. (1953). On Padoa’s Method in the Theory of Deﬁnit ion. Indaga- tiones Mathematicae (Proceedings), 56:330–339

work page 1953

[3] [3]

G., Bennett, B., Gooday, J., and Gotts, N

Cohn, A. G., Bennett, B., Gooday, J., and Gotts, N. M. (199 7). Qualitative Spatial Representation and Reasoning with the Region Conne ction Calculus. Geoinformatica, 1(3):275–316

work page

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and Vakarelov, D

Dimov, G. and Vakarelov, D. (2006). Contact Algebras and Region-based Theory of Space: A Proximity Approach–I. Fundamenta Informaticae, 74(2– 3):209–249

work page 2006

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and Winter, M

Düntsch, I. and Winter, M. (2005). A representation theo rem for Boolean contact algebras. Theoretical Computer Science , 347(3):498–512

work page 2005

[6] [6]

and Grice, M

Goldblatt, R. and Grice, M. (2016). Mereocompactness an d duality for mereotopological spaces. In Bimbó, K., editor, J. Michael Dunn on Informa- tion Based Logics , pages 313–330. Springer International Publishing, Cham

work page 2016

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and Menchón, P

Gruszczyński, R. and Menchón, P. (2023). From contact re lations to modal operators, and back. Studia Logica, 111(5):717–748

work page 2023

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Ivanova, T. (2020). Extended contact algebras and inter nal connectedness. Studia Logica, 108(2):239–254. 12 NON-DEFINABILITY OF INTERNAL CONNECTEDNESS

work page 2020

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Johnstone, P. T. (1983). The point of pointless topology . Bulletin (New Series) of the American Mathematical Society , 8(1):41–53

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Kontchakov, R., Pratt-Hartmann, I., Wolter, F., and Za kharyaschev, M. (1998). Topology, connectedness, and modal logic. In Krach t, M., de Rijke, M., Wansing, H., and Zakharyaschev, M., editors, Advances in Modal Logic , pages 151–176. CSLI Publications

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Kontchakov, R., Pratt-Hartmann, I., Wolter, F., and Za kharyaschev, M. (2010). Spatial logics with connectedness predicates. Logical Methods in Computer Science , 6(3)

work page 2010

[12] [12]

and Lemon, O

Pratt, I. and Lemon, O. (1997). Ontologies for plane, po lygonal mereotopology. Notre Dame J. Formal Logic , 38(2):225–245

work page 1997

[13] [13]

and Schoop, D

Pratt, I. and Schoop, D. (2000). Expressivity in polygo nal, plane mereotopology. Journal of Symbolic Logic , 65(2):822–838

work page 2000

[14] [14]

Pratt-Hartmann, I. (2001). Empiricism and rationalis m in region-based theories of space. Fundamenta Informaticae, 46(1–2):159–186

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Vakarelov, D. (2007). Region-based theory of space: Al gebras of regions, representation theory, and logics. In Gabbay, D. M., Zakhar yaschev, M., and Goncharov, S. S., editors, Mathematical Problems from Applied Logic II: Logics for the XXIst Century , pages 267–348. Springer, New York, NY. Raf ał Gruszczyński, Orcid: 0000-0002-3379-0577, Paula Menc hón,...

work page 2007