Algorithmic Structuring of Cut-free Proofs

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In Börger Egon, Kleine Büning Hans, Jäger Gerhard, Martini Simone & Richter Michael M. (eds.), Computer Science Logic. CSL’92, San Miniato, Italy. Selected Papers. Springer. pp. 29–42 (1993)
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Abstract

The problem of algorithmic structuring of proofs in the sequent calculi LK and LKB ( LK where blocks of quantifiers can be introduced in one step) is investigated, where a distinction is made between linear proofs and proofs in tree form. In this framework, structuring coincides with the introduction of cuts into a proof. The algorithmic solvability of this problem can be reduced to the question of k-l-compressibility: "Given a proof of length k , and l ≤ k : Is there is a proof of length ≤ l ?" When restricted to proofs with universal or existential cuts, this problem is shown to be (1) undecidable for linear or tree-like LK-proofs (corresponds to the undecidability of second order unification), (2) undecidable for linear LKB-proofs (corresponds to the undecidability of semi-unification), and (3) decidable for tree-like LKB -proofs (corresponds to a decidable subprob- lem of semi-unification).

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Author Profiles

Matthias Baaz
TU Wien
Richard Zach
University of Calgary

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Untersuchungen über das logische Schließen. II.Gerhard Gentzen - 1935 - Mathematische Zeitschrift 39:405–431.
The undecidability of k-provability.Samuel Buss - 1991 - Annals of Pure and Applied Logic 53 (1):75-102.
Structural Complexity of Proofs.Richard Statman - 1974 - Dissertation, Stanford University

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