Technical Report -- A Context-Sensitive Multi-Level Similarity Framework for First-Order Logic Arguments: An Axiomatic Study

Jean-Guy Mailly; J\'er\^ome Delobelle; Victor David

arxiv: 2604.12534 · v1 · submitted 2026-04-14 · 💻 cs.AI · cs.LO

Technical Report -- A Context-Sensitive Multi-Level Similarity Framework for First-Order Logic Arguments: An Axiomatic Study

Victor David , J\'er\^ome Delobelle , Jean-Guy Mailly This is my paper

Pith reviewed 2026-05-10 15:26 UTC · model grok-4.3

classification 💻 cs.AI cs.LO

keywords first-order logicargument similaritymulti-level modelcontextual weightsaxiomatic foundationformal constraintsenthymeme decodingargument aggregation

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The pith

A four-level parametric model with contextual weights measures similarity between first-order logic arguments while satisfying formal constraints.

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

The paper sets out to build a framework that judges how similar two arguments are when they are written in first-order logic rather than simple propositional logic. It does this by extending an axiomatic base and defining similarity at four nested levels: predicates, literals, clauses, and whole formulae. Two families of models are proposed, one of them using language models to capture syntax, and both families add contextual weights so that the resulting scores can be explained. The framework also includes formal constraints that the similarity function must obey. A reader would care because many practical tasks in argumentation, such as combining multiple arguments or filling in missing premises, depend on reliable similarity judgments that respect logical structure.

Core claim

The central claim is that an extended axiomatic foundation together with a four-level parametric model (predicates to formulae) and contextual weights yields a similarity measure for first-order logic arguments that is both nuanced and guaranteed to satisfy desirable formal properties, with one model family using language models for syntax sensitivity.

What carries the argument

The four-level parametric model that computes similarity separately at the predicate, literal, clause, and formula levels, then combines them with contextual weights under formal constraints.

If this is right

Similarity judgments become explainable because each level contributes a weighted component.
The same model can be used for argument aggregation in semantics and for enthymeme decoding.
Formal constraints guarantee properties such as symmetry or monotonicity hold across the four levels.
Both syntax-sensitive language-model models and other parametric families can be plugged into the framework.

Where Pith is reading between the lines

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

The framework could be tested by checking whether its scores improve retrieval accuracy when logical arguments are stored in a database.
Parameter tuning at each level might allow the same machinery to adapt to different domains of reasoning without rewriting the axioms.
If the constraints prove non-vacuous on real formulae, the approach could serve as a template for similarity in other structured logical languages.

Load-bearing premise

The four levels and contextual weights interact so that the resulting similarity scores accurately reflect structured first-order content and obey the stated formal constraints.

What would settle it

A pair of first-order formulae for which the computed similarity score violates one of the formal constraints or fails to align with expert judgment on the structural overlap of predicates, literals, clauses, or quantifiers.

Figures

Figures reproduced from arXiv: 2604.12534 by Jean-Guy Mailly, J\'er\^ome Delobelle, Victor David.

**Figure 2.** Figure 2: Similarity on the premises of A1 vs A2 where 1 = α1, 2 = α2, 3 = α3, 4 = α4, 5 = α5, 6 = α6, 7 = α7, 8 = α8 and 9 = α9 on the x-axis [PITH_FULL_IMAGE:figures/full_fig_p011_2.png] view at source ↗

**Figure 3.** Figure 3: Similarity on the claims of A1 vs A2 where 1 = β1 and 2 = β2 on the x-axis. Finally, we compute the similarity between A1 and A2 using two values of η ∈ {0.2, 0.5}: simArgM 0.5 (A1, A2) = 0.5 × 0.795 + 0.5 × 0.757 = 0.776 simArgM 0.2 (A1, A2) = 0.2 × 0.795 + 0.8 × 0.757 = 0.7646 Since the similarity scores between the premises and the claims of the two arguments are close, changing the value of η will not … view at source ↗

**Figure 4.** Figure 4: Influence of η on argument similarity: higher values prioritize the support, lower values the claim [PITH_FULL_IMAGE:figures/full_fig_p012_4.png] view at source ↗

**Figure 5.** Figure 5: Similarity on the premises of A2 vs A3 where 1 = α5, 2 = α6, 3 = α7, 4 = α8, 5 = α9, 6 = α10, 7 = α11, 8 = α12, 9 = α13 and 10 = α14 on the x-axis [PITH_FULL_IMAGE:figures/full_fig_p012_5.png] view at source ↗

**Figure 6.** Figure 6: Similarity on the claims of A2 vs A3 where 1 = β2 and 2 = β3 on the x-axis. In future work, we plan to further refine the weighting schemes and investigate task-specific strategies for argument-level aggregation. Proofs. Proof (Theorem 1). Let a similarity model M = ⟨simP, simL, simC, simS⟩ such that: 1. simP(t, t) = 1. 2. simL((P, ⃗a),(Q,⃗b)) = 1 if simP(P, Q) = 1, |⃗a| = | ⃗b|, and ∀ai ∈ ⃗a, ∀bi ∈⃗b, si… view at source ↗

read the original abstract

Similarity in formal argumentation has recently gained attention due to its significance in problems such as argument aggregation in semantics and enthymeme decoding. While existing approaches focus on propositional logic, we address the richer setting of First-Order Logic (FOL), where similarity must account for structured content. We introduce a comprehensive framework for FOL argument similarity, built upon: (1) an extended axiomatic foundation; (2) a four-level parametric model covering predicates, literals, clauses, and formulae similarity; (3) two model families, one syntax-sensitive via language models, both integrating contextual weights for nuanced and explainable similarity; and (4) formal constraints enforcing desirable properties.

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.

Referee Report

2 major / 2 minor

Summary. The paper introduces a context-sensitive multi-level similarity framework for First-Order Logic arguments. It extends an axiomatic foundation for similarity, defines a four-level parametric model (predicates, literals, clauses, formulae), presents two model families (one syntax-sensitive via language models), integrates contextual weights for nuanced and explainable scores, and specifies formal constraints to enforce desirable properties such as symmetry and context-sensitivity.

Significance. If the level-wise compositions are shown to satisfy the axioms non-vacuously and the models are validated, the framework could advance formal argumentation by enabling structured, interpretable similarity measures for FOL content beyond propositional approaches, supporting tasks like argument aggregation and enthymeme decoding. The parametric design with contextual weights offers potential for explainability.

major comments (2)

[Four-level parametric model and axiomatic foundation] The central claim that the four-level parametric model plus contextual weights satisfies the extended axiomatic foundation lacks any proof, inductive argument, or concrete worked example showing that aggregation functions preserve required properties (e.g., symmetry, monotonicity) when lifted from predicate similarity to full formula similarity. This is load-bearing, as the constraints could hold vacuously without such verification.
[Model families and formal constraints] No derivation details, validation data, or constraint proofs are provided to confirm that the parametric models support accurate similarity judgments for structured FOL content or that the two model families (including the LM-based syntax-sensitive one) interact correctly with the formal constraints.

minor comments (2)

[Abstract] The abstract is dense with contributions; consider listing the four main elements more explicitly with brief definitions for improved readability.
Standardize notation for contextual weights and parametric forms across sections to prevent potential confusion in the multi-level definitions.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their thorough review and constructive feedback on our technical report. We address the major comments point by point below, acknowledging areas where the manuscript requires strengthening and outlining specific revisions.

read point-by-point responses

Referee: [Four-level parametric model and axiomatic foundation] The central claim that the four-level parametric model plus contextual weights satisfies the extended axiomatic foundation lacks any proof, inductive argument, or concrete worked example showing that aggregation functions preserve required properties (e.g., symmetry, monotonicity) when lifted from predicate similarity to full formula similarity. This is load-bearing, as the constraints could hold vacuously without such verification.

Authors: We agree that the manuscript states the four-level parametric model and contextual weights satisfy the extended axioms but does not supply the requested inductive arguments or concrete examples to verify non-vacuous preservation of properties such as symmetry and monotonicity during aggregation from predicates to formulae. This is a substantive gap. In the revised manuscript we will add a new subsection containing an inductive proof sketch for property preservation across levels together with a fully worked example on a sample FOL argument. revision: yes
Referee: [Model families and formal constraints] No derivation details, validation data, or constraint proofs are provided to confirm that the parametric models support accurate similarity judgments for structured FOL content or that the two model families (including the LM-based syntax-sensitive one) interact correctly with the formal constraints.

Authors: The manuscript is an axiomatic technical report that defines the two model families (including the LM-based syntax-sensitive variant) and states their interaction with the formal constraints, but it indeed omits detailed derivations and explicit constraint proofs. Because the work is theoretical rather than empirical, validation data lies outside its current scope and will be pursued in follow-up studies. We will revise the manuscript to include derivation sketches and additional formal verification that the model families satisfy the constraints. revision: partial

Circularity Check

0 steps flagged

No circularity: axioms and parametric model presented as independent construction

full rationale

The provided abstract and skeptic analysis describe an extended axiomatic foundation paired with a four-level parametric model whose aggregation is asserted to satisfy the axioms. No equations, self-citations, or fitted-parameter renamings are exhibited that would reduce any claimed prediction or composition result to its inputs by construction. The framework is therefore self-contained against its own stated formal constraints; the absence of a worked inductive check or concrete example is a completeness issue, not a circularity reduction.

Axiom & Free-Parameter Ledger

0 free parameters · 0 axioms · 0 invented entities

Abstract-only review yields no concrete axioms, free parameters, or invented entities; the text mentions an 'extended axiomatic foundation' and 'formal constraints' plus a 'parametric model' but gives no specifics or values.

pith-pipeline@v0.9.0 · 5419 in / 1221 out tokens · 56823 ms · 2026-05-10T15:26:59.362430+00:00 · methodology

discussion (0)

Reference graph

Works this paper leans on

9 extracted references · 9 canonical work pages

[1]

In2023 IEEE International Conference on Un- manned Systems (ICUS), 1738–1743

Argumentative Explanation for Deep Learning: A Survey. In2023 IEEE International Conference on Un- manned Systems (ICUS), 1738–1743. IEEE. Han, S.; Schoelkopf, H.; Zhao, Y .; Qi, Z.; Riddell, M.; Zhou, W.; Coady, J.; Peng, D.; Qiao, Y .; Benson, L.; Sun, L.; Wardle-Solano, A.; Szab´o, H.; Zubova, E.; Burtell, M.; Fan, J.; Liu, Y .; Wong, B.; Sailor, M.; N...

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Reimers, N.; and Gurevych, I

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Harnessing the Power of Large Language Models for Natural Language to First-Order Logic Translation. InProc. of the 62nd Annual Meeting of the Association for Compu- tational Linguistics (Volume 1: Long Papers), ACL, 6942–

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A dog is teasing a monkey at the zoo, and teas- ing usually indicates dominance or playful behavior

Association for Computational Linguistics. Zhong, Q.; Fan, X.; Luo, X.; and Toni, F. 2019. An explain- able multi-attribute decision model based on argumentation. Expert Sys. and Appl., 117: 42–61. . Supplementary Material Similarity Between Arguments. In this section, we illustrate how our similarity framework can be applied to structured arguments, wher...

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= 0, c.∀C 1 ∈C(A c),∀(P 1, ⃗ a1)∈C 1,∀a i 1 ∈⃗ a1,∀C 2 ∈ C(Bc),∀(P 2, ⃗ a2)∈C 2,∀a j 2 ∈⃗ a2,simP(P 1, P2) = 0 andsimP(a i 1, aj

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Assume thatMsatisfies the three hypotheses from Theo- rem 5,i.e.: 1.simL((P, ⃗ a),(Q,⃗b)) = 0ifsimP(P, Q) = 0and∀a i ∈ ⃗ a,∀bj ∈ ⃗b,simP(a i, bj) = 0

= 0. Assume thatMsatisfies the three hypotheses from Theo- rem 5,i.e.: 1.simL((P, ⃗ a),(Q,⃗b)) = 0ifsimP(P, Q) = 0and∀a i ∈ ⃗ a,∀bj ∈ ⃗b,simP(a i, bj) = 0. 2.simC(C 1, C2) = 0if∀l 1 ∈C 1,∀l 2 ∈C 2,simL(l 1, l2) = 0. 3.simS(Φ 1,Φ 2) = 0if∀C 1 ∈Φ 1,∀C 2 ∈Φ 2, simC(C1, C2) = 0. From condition a., we know that the supports of bothA c andB c are non-empty, i.e...

work page
[7]

By condition 1 and fact (b), we have simL((P1, ⃗ a1),(P 2, ⃗ a2))>0

work page
[8]

By condition 2, it follows thatsimC(C 1, C2)>0

work page
[9]

By condition 3, since we assumew c(C1), wc(C2)>0, it follows that: simS(S(Ac),S(B c))>0 Finally, by Definition 7, this implies: simArgM η (A, B)>0 which concludes the proof thatsimArg M η satisfiesNon- Zerounder the stated conditions. Proof (Theorem 7).Let a similarity modelM= ⟨simP,simL,simC,simS⟩, two set of clausesΦ,Ψ and two clausesC 0, C1, such thats...

work page

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In2023 IEEE International Conference on Un- manned Systems (ICUS), 1738–1743

Argumentative Explanation for Deep Learning: A Survey. In2023 IEEE International Conference on Un- manned Systems (ICUS), 1738–1743. IEEE. Han, S.; Schoelkopf, H.; Zhao, Y .; Qi, Z.; Riddell, M.; Zhou, W.; Coady, J.; Peng, D.; Qiao, Y .; Benson, L.; Sun, L.; Wardle-Solano, A.; Szab´o, H.; Zubova, E.; Burtell, M.; Fan, J.; Liu, Y .; Wong, B.; Sailor, M.; N...

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Reimers, N.; and Gurevych, I

Association for Computational Linguistics. Reimers, N.; and Gurevych, I. 2019. Sentence-BERT: Sen- tence Embeddings using Siamese BERT-Networks. InProc. of the Conference on Empirical Methods in Natural Lan- guage Processing and the 9th International Joint Confer- ence on Natural Language Processing, EMNLP-IJCNLP, 3980–3990. Association for Computational ...

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Harnessing the Power of Large Language Models for Natural Language to First-Order Logic Translation. InProc. of the 62nd Annual Meeting of the Association for Compu- tational Linguistics (Volume 1: Long Papers), ACL, 6942–

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A dog is teasing a monkey at the zoo, and teas- ing usually indicates dominance or playful behavior

Association for Computational Linguistics. Zhong, Q.; Fan, X.; Luo, X.; and Toni, F. 2019. An explain- able multi-attribute decision model based on argumentation. Expert Sys. and Appl., 117: 42–61. . Supplementary Material Similarity Between Arguments. In this section, we illustrate how our similarity framework can be applied to structured arguments, wher...

work page 2019

[5] [5]

= 0, c.∀C 1 ∈C(A c),∀(P 1, ⃗ a1)∈C 1,∀a i 1 ∈⃗ a1,∀C 2 ∈ C(Bc),∀(P 2, ⃗ a2)∈C 2,∀a j 2 ∈⃗ a2,simP(P 1, P2) = 0 andsimP(a i 1, aj

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Assume thatMsatisfies the three hypotheses from Theo- rem 5,i.e.: 1.simL((P, ⃗ a),(Q,⃗b)) = 0ifsimP(P, Q) = 0and∀a i ∈ ⃗ a,∀bj ∈ ⃗b,simP(a i, bj) = 0

= 0. Assume thatMsatisfies the three hypotheses from Theo- rem 5,i.e.: 1.simL((P, ⃗ a),(Q,⃗b)) = 0ifsimP(P, Q) = 0and∀a i ∈ ⃗ a,∀bj ∈ ⃗b,simP(a i, bj) = 0. 2.simC(C 1, C2) = 0if∀l 1 ∈C 1,∀l 2 ∈C 2,simL(l 1, l2) = 0. 3.simS(Φ 1,Φ 2) = 0if∀C 1 ∈Φ 1,∀C 2 ∈Φ 2, simC(C1, C2) = 0. From condition a., we know that the supports of bothA c andB c are non-empty, i.e...

work page

[7] [7]

By condition 1 and fact (b), we have simL((P1, ⃗ a1),(P 2, ⃗ a2))>0

work page

[8] [8]

By condition 2, it follows thatsimC(C 1, C2)>0

work page

[9] [9]

By condition 3, since we assumew c(C1), wc(C2)>0, it follows that: simS(S(Ac),S(B c))>0 Finally, by Definition 7, this implies: simArgM η (A, B)>0 which concludes the proof thatsimArg M η satisfiesNon- Zerounder the stated conditions. Proof (Theorem 7).Let a similarity modelM= ⟨simP,simL,simC,simS⟩, two set of clausesΦ,Ψ and two clausesC 0, C1, such thats...

work page