Fundamental Logic Through the Lens of Modality
Pith reviewed 2026-06-30 03:42 UTC · model grok-4.3
The pith
Modal translations provide full and faithful embeddings of fundamental logic into orthological S4 and an intuitionistic version of KTB.
A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.
Core claim
The GMT translation of intuitionistic logic into S4 is a full and faithful embedding of fundamental logic into the orthological version of S4; the Goldblatt translation of orthologic into KTB is a full and faithful embedding of fundamental logic into an intuitionistic version of KTB; and the GMT translation is a full and faithful embedding of intuitionistic logic into a modal extension of fundamental logic.
What carries the argument
The GMT translation and the Goldblatt translation, each acting as a full and faithful embedding that preserves and reflects provability between fundamental logic and the target modal systems.
If this is right
- Fundamental logic sits inside orthological S4 and inside intuitionistic KTB as a common fragment preserved exactly by the translations.
- Intuitionistic logic embeds into a modal extension of fundamental logic, showing that the latter can serve as a base for recovering intuitionistic theorems via modality.
- Orthologic and intuitionistic logic become comparable through their respective modal embeddings of the same fundamental core.
- Natural deduction derivations in fundamental logic correspond exactly to derivations in the image logics under the translations.
Where Pith is reading between the lines
- The results suggest that modality can act as a neutral bridge for comparing non-classical logics that otherwise lack a shared semantics.
- If the embeddings hold, then completeness or decidability results for one system might transfer to fundamental logic via the translations.
- The approach leaves open whether similar embeddings exist for other modal bases or for first-order extensions beyond the quantifier rules already included.
Load-bearing premise
The natural deduction rules for fundamental logic and the definitions of the orthological and intuitionistic modal logics are set up so that the translations preserve and reflect logical structure in both directions.
What would settle it
A formula provable in fundamental logic whose image under the GMT translation is not provable in the orthological version of S4, or vice versa.
Figures
read the original abstract
Fundamental logic is a non-classical logic based only on the introduction and elimination rules for conjunction, disjunction, negation, and the quantifiers in a Fitch-style natural deduction system. In this paper, we attempt to obtain a better understanding of fundamental logic and its semantics through the lens of modality. Using modal logic, we develop means of mutual understanding between the fundamental logician, on the one hand, and the orthologician and intuitionistic logician, on the other: we prove that the G\"odel-McKinsey-Tarski (GMT) translation of intuitionistic logic into the classical modal logic $\mathsf{S4}$ is a full and faithful embedding of fundamental logic into the orthological version of $\mathsf{S4}$; that the Goldblatt translation of orthologic into the classical modal logic $\mathsf{KTB}$ is a full and faithful embedding of fundamental logic into an intuitionistic version of $\mathsf{KTB}$; and that the GMT translation is a full and faithful embedding of intuitionistic logic into a modal extension of fundamental logic.
Editorial analysis
A structured set of objections, weighed in public.
Referee Report
Summary. The manuscript defines fundamental logic via a Fitch-style natural deduction system consisting solely of the introduction and elimination rules for conjunction, disjunction, negation, and the quantifiers. It then establishes three embedding results: the Gödel-McKinsey-Tarski (GMT) translation yields a full and faithful embedding of fundamental logic into the orthological variant of S4; the Goldblatt translation yields a full and faithful embedding of fundamental logic into an intuitionistic variant of KTB; and the GMT translation yields a full and faithful embedding of intuitionistic logic into a modal extension of fundamental logic. All results are proved from the natural-deduction presentation.
Significance. If the embeddings are indeed full and faithful, the work supplies a precise modal bridge between fundamental logic and both orthologic and intuitionistic logic, allowing direct comparison of their deductive structures. The use of natural-deduction presentations rather than axiomatic ones strengthens the claims by making the preservation of rules explicit and verifiable.
minor comments (1)
- [Abstract] The abstract and introduction would benefit from a brief, self-contained statement of the precise natural-deduction rules that constitute fundamental logic before the embedding theorems are stated.
Simulated Author's Rebuttal
We thank the referee for their positive summary, significance assessment, and recommendation to accept the manuscript. There are no major comments requiring response.
Circularity Check
No significant circularity identified
full rationale
The paper defines fundamental logic via its Fitch-style natural deduction rules for the standard connectives and quantifiers, then proves three embedding theorems using the standard GMT translation (into orthological S4) and Goldblatt translation (into intuitionistic KTB). These are syntactic preservation/reflection results between independently presented systems; no step reduces a claimed prediction or embedding to a fitted parameter, self-citation chain, or definitional renaming. The derivations rest on the explicit rule sets and translation clauses rather than on any prior result by the same authors that would render the central claims tautological.
Axiom & Free-Parameter Ledger
axioms (2)
- domain assumption Introduction and elimination rules for conjunction, disjunction, negation, and quantifiers define fundamental logic in Fitch-style natural deduction.
- standard math Standard semantics and properties of classical modal logics S4 and KTB.
Reference graph
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