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Yeo’s Theorem for Locally Colored Graphs: the Path to Sequentialization in Linear Logic

Authors Rémi Di Guardia, Olivier Laurent , Lorenzo Tortora de Falco , Lionel Vaux Auclair

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Subject Classification

ACM Subject Classification
  • Mathematics of computing → Graph coloring
  • Theory of computation → Linear logic
Keywords
  • Linear Logic
  • Proof Net
  • Sequentialization
  • Graph Theory
  • Yeo’s Theorem

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Abstract

We revisit sequentialization proofs associated with the Danos-Regnier correctness criterion in the theory of proof nets of linear logic. Our approach relies on a generalization of Yeo’s theorem for graphs, based on colorings of half-edges. This happens to be the appropriate level of abstraction to extract sequentiality information from a proof net without modifying its graph structure. We thus obtain different ways of recovering a sequent calculus derivation from a proof net inductively, by relying on a splitting ⅋-vertex, on a splitting ⊗-vertex, on a splitting terminal vertex, etc.
The proof of our Yeo-style theorem relies on a key lemma that we call cusp minimization. Given a coloring of half-edges, a cusp in a path is a vertex whose adjacent half-edges in the path have the same color. And, given a cycle with at least one cusp and subject to suitable hypotheses, cusp minimization constructs a cycle with strictly less cusps. In the absence of cusp-free cycles, cusp minimization is then enough to ensure the existence of a splitting vertex, i.e. a vertex that is a cusp of any cycle it belongs to. Our theorem subsumes several graph-theoretical results, including some known to be equivalent to Yeo’s theorem. The novelty is that they can be derived in a straightforward way, just by defining a dedicated coloring, again without any modification of the underlying graph structure (vertices and edges) - similar results from the literature required more involved encodings.

Cite As Get BibTex

Rémi Di Guardia, Olivier Laurent, Lorenzo Tortora de Falco, and Lionel Vaux Auclair. Yeo’s Theorem for Locally Colored Graphs: the Path to Sequentialization in Linear Logic. In 10th International Conference on Formal Structures for Computation and Deduction (FSCD 2025). Leibniz International Proceedings in Informatics (LIPIcs), Volume 337, pp. 16:1-16:18, Schloss Dagstuhl – Leibniz-Zentrum für Informatik (2025) https://doi.org/10.4230/LIPIcs.FSCD.2025.16

Author Details

Rémi Di Guardia
  • Université Paris Cité, CNRS, IRIF, Paris, France
Olivier Laurent
  • CNRS, ENS de Lyon, Université Claude Bernard Lyon 1, LIP, UMR 5668, Lyon, France
Lorenzo Tortora de Falco
  • Università Roma Tre, Dipartimento di Matematica e Fisica, Rome, Italy
  • GNSAGA, Istituto Nazionale di Alta Matematica, Rome, Italy
Lionel Vaux Auclair
  • Aix Marseille Univ, CNRS, I2M, Marseille, France

Funding

  • Di Guardia, Rémi: Partially funded by the French PEPR integrated project EPIQ (ANR-22-PETQ-0007).
  • Laurent, Olivier: Partially funded by French ANR project ReCiProg (ANR-21-CE48-0019).
  • Vaux Auclair, Lionel: Partially funded by French ANR projects PPS (ANR-19-CE48-0014), LambdaComb (ANR-21-CE48-0017), and ReCiProg (ANR-21-CE48-0019).

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