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arxiv: 2606.31886 · v1 · pith:VOEAZIBXnew · submitted 2026-06-30 · 💻 cs.MA · cs.LO

Analytic Cut in Epistemic Logics with Distributed Knowledge

Pith reviewed 2026-07-01 02:23 UTC · model grok-4.3

classification 💻 cs.MA cs.LO
keywords epistemic logicdistributed knowledgesequent calculusanalytic cutCraig interpolationmodal logicK45S5
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The pith

Sequent calculi for epistemic logics with distributed knowledge admit analytic cut, which yields Craig interpolation.

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

The paper establishes that sequent calculi for epistemic logics of distributed knowledge based on K45, KD45, and S5 satisfy the analytic cut property even though full cut elimination fails. Distributed knowledge is interpreted through the intersection of individual accessibility relations, and the authors adapt a restriction of cut formulas to subformulas of the conclusion sequent to prove the property. If this holds, the Craig interpolation theorem follows directly as a corollary for each system. The same analytic cut results continue to hold when the empty group is permitted, in which case distributed knowledge for the empty group acts as the global modality.

Core claim

We establish the analytic cut property for all three systems by adapting a strategy that restricts the cut formulas to the set of subformulas of the conclusion of the cut rule. As a corollary, the Craig interpolation theorem holds for all logics considered. We also show that all proof-theoretic results remain valid when the empty group is allowed for the distributed-knowledge operator, in which case the distributed knowledge for the empty group is interpreted as the global modality.

What carries the argument

Analytic cut rule restricting cut formulas to subformulas of the conclusion sequent, applied to sequent calculi whose distributed-knowledge rules encode intersection semantics.

If this is right

  • Craig interpolation holds for the three systems based on K45, KD45, and S5.
  • All proof-theoretic results, including analytic cut, continue to hold when the empty group is allowed and distributed knowledge becomes the global modality.
  • The subformula property follows from analytic cut and supports decision procedures for these logics.
  • The sequent systems remain sound and complete with respect to the intersection semantics.

Where Pith is reading between the lines

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

  • The same restriction technique could be tested on other group modalities whose semantics involve intersections or unions of relations.
  • Analytic cut may supply a uniform route to interpolation in related multi-agent logics that currently lack cut elimination.
  • The results suggest that proof search algorithms for these logics can safely limit attention to subformulas once analytic cut is in place.

Load-bearing premise

The restriction of cut formulas to subformulas can be carried over to these calculi without extra complications from the intersection semantics of distributed knowledge.

What would settle it

A concrete sequent in one of the three systems for which every cut-free proof requires a cut formula outside the subformulas of the conclusion, or a pair of formulas in one logic for which no interpolant exists.

read the original abstract

Distributed knowledge is a notion of group knowledge studied in multi-agent epistemic logic. Semantically, the distributed knowledge of a group is interpreted via an accessibility relation given by the intersection of the epistemic accessibility relations of the agents in that group. This paper investigates sequent calculi for epistemic logics of distributed knowledge based on K45, KD45, and S5. While cut elimination holds in existing sequent calculi for modal logics K45 and KD45, it fails in all the systems mentioned above. Instead, we establish the analytic cut property for all three systems by adapting Takano' s (2018) strategy, which restricts the cut formulas to the set of subformulas of the conclusion of the cut rule. As a corollary, the Craig interpolation theorem holds for all logics considered. We also show that all proof-theoretic results remain valid when the empty group is allowed for the distributed-knowledge operator, in which case the distributed knowledge for the empty group is interpreted as the global modality.

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 / 1 minor

Summary. The paper develops sequent calculi for epistemic logics with distributed knowledge extending K45, KD45 and S5. It observes that standard cut elimination fails in these systems but establishes the analytic cut property by adapting Takano's (2018) strategy of restricting cut formulas to subformulas of the cut conclusion. Craig interpolation is obtained as a corollary. The results are claimed to remain valid when the empty group is permitted, interpreting D_∅ as the global modality.

Significance. If the adaptation is shown to succeed without extra lemmas or enlargement of the subformula set, the work supplies a uniform proof-theoretic treatment of distributed knowledge that yields interpolation for these systems. Interpolation is a valuable property for epistemic logics in multi-agent settings. The explicit treatment of the empty-group case is a useful extension.

major comments (2)
  1. [analytic cut proof (adaptation of Takano 2018)] The central claim rests on a direct adaptation of Takano's subformula restriction to the D_G rules. The manuscript must explicitly verify that the intersection-semantics rules for D_G do not generate principal-formula interactions in cut reduction that fall outside the subformula closure of the conclusion; otherwise the restriction fails to be analytic.
  2. [extension to empty group] The extension to the empty group requires a separate check that the global-modality rule does not force additional cut-formula cases beyond those already covered by the subformula property; the manuscript should list the relevant reduction cases.
minor comments (1)
  1. The abstract would be clearer if it briefly indicated the form of the sequent rules adopted for the distributed-knowledge operators.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for the careful reading and constructive comments. The positive assessment of the significance of the results is appreciated. We respond to each major comment below.

read point-by-point responses
  1. Referee: The central claim rests on a direct adaptation of Takano's subformula restriction to the D_G rules. The manuscript must explicitly verify that the intersection-semantics rules for D_G do not generate principal-formula interactions in cut reduction that fall outside the subformula closure of the conclusion; otherwise the restriction fails to be analytic.

    Authors: We agree that an explicit verification strengthens the argument. Although the adaptation of Takano's strategy is direct and the subformula property is preserved by the intersection semantics in our case analysis, the revised manuscript will add a dedicated lemma enumerating the principal-formula interactions for the D_G rules and confirming that all resulting formulas lie within the subformula closure of the cut conclusion. revision: yes

  2. Referee: The extension to the empty group requires a separate check that the global-modality rule does not force additional cut-formula cases beyond those already covered by the subformula property; the manuscript should list the relevant reduction cases.

    Authors: We concur that a separate, explicit listing improves clarity. The revised version will include an additional paragraph or subsection that lists the cut-reduction cases involving the global-modality rule for D_∅ and verifies that no new cut formulas outside the subformula set are generated. revision: yes

Circularity Check

0 steps flagged

No circularity: analytic-cut result obtained by direct adaptation of external Takano (2018) strategy

full rationale

The paper's central claim is a proof-theoretic result obtained by adapting an external reference (Takano 2018) to the new sequent rules for distributed knowledge. No equations, fitted parameters, self-definitional constructions, or load-bearing self-citations appear. The derivation chain consists of standard sequent-calculus manipulations whose validity is established relative to an independent prior result rather than reducing to the paper's own inputs by construction. The empty-group extension is likewise shown to preserve the same external adaptation. This is the normal case of a self-contained proof paper.

Axiom & Free-Parameter Ledger

0 free parameters · 2 axioms · 0 invented entities

The work rests on the standard modal axioms for K45, KD45, and S5 together with the intersection semantics for distributed knowledge; no free parameters, no new entities, and no ad-hoc axioms are introduced in the abstract.

axioms (2)
  • standard math Standard axioms and rules of K45, KD45, and S5 modal logics
    The paper builds sequent calculi on these established modal bases.
  • domain assumption Distributed knowledge interpreted via intersection of individual accessibility relations
    This is the standard Kripke semantics for the distributed-knowledge operator.

pith-pipeline@v0.9.1-grok · 5714 in / 1338 out tokens · 48639 ms · 2026-07-01T02:23:09.166609+00:00 · methodology

discussion (0)

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Reference graph

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