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  1. The Elimination of Maximum Cuts in Linear Logic and BCK Logic.Mirjana Borisavljevic - 2023 - Studia Logica 111 (3):391-429.
    In the sequent systems for exponential-free linear logic and BCK logic a procedure of elimination of maximum cuts, cuts which correspond to maximum segments from natural deduction derivations, will be presented.
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  • Maximum Segments as Natural Deduction Images of Some Cuts.Mirjana Borisavljević - 2022 - Logica Universalis 16 (3):499-533.
    A special kind of maximum cuts in sequent derivations, actual maximum cuts, is defined. It is shown that (1) each actual maximum cut of a sequent derivation makes maximum segments in its natural deduction image, and (2) each maximum segment of a natural deduction derivation makes an actual maximum cut in its sequent image.
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  • k-Provability in $$\hbox {PA}$$ PA.Paulo Guilherme Santos & Reinhard Kahle - 2021 - Logica Universalis 15 (4):477-516.
    We study the decidability of k-provability in \—the relation ‘being provable in \ with at most k steps’—and the decidability of the proof-skeleton problem—the problem of deciding if a given formula has a proof that has a given skeleton. The decidability of k-provability for the usual Hilbert-style formalisation of \ is still an open problem, but it is known that the proof-skeleton problem is undecidable for that theory. Using new methods, we present a characterisation of some numbers k for which (...)
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  • Identity of proofs based on normalization and generality.Kosta Došen - 2003 - Bulletin of Symbolic Logic 9 (4):477-503.
    Some thirty years ago, two proposals were made concerning criteria for identity of proofs. Prawitz proposed to analyze identity of proofs in terms of the equivalence relation based on reduction to normal form in natural deduction. Lambek worked on a normalization proposal analogous to Prawitz's, based on reduction to cut-free form in sequent systems, but he also suggested understanding identity of proofs in terms of an equivalence relation based on generality, two derivations having the same generality if after generalizing maximally (...)
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  • The subformula property of natural deduction derivations and analytic cuts.Mirjana Borisavljević - forthcoming - Logic Journal of the IGPL.
    In derivations of a sequent system, $\mathcal{L}\mathcal{J}$, and a natural deduction system, $\mathcal{N}\mathcal{J}$, the trails of formulae and the subformula property based on these trails will be defined. The derivations of $\mathcal{N}\mathcal{J}$ and $\mathcal{L}\mathcal{J}$ will be connected by the map $g$, and it will be proved the following: an $\mathcal{N}\mathcal{J}$-derivation is normal $\Longleftrightarrow $ it has the subformula property based on trails $\Longleftrightarrow $ its $g$-image in $\mathcal{L}\mathcal{J}$ is without maximum cuts $\Longrightarrow $ that $g$-image has the subformula property based (...)
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  • Models of Deduction.Kosta Dosen - 2006 - Synthese 148 (3):639-657.
    In standard model theory, deductions are not the things one models. But in general proof theory, in particular in categorial proof theory, one finds models of deductions, and the purpose here is to motivate a simple example of such models. This will be a model of deductions performed within an abstract context, where we do not have any particular logical constant, but something underlying all logical constants. In this context, deductions are represented by arrows in categories involved in a general (...)
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  • Intuitionistic N-Graphs.M. Quispe-Cruz, A. G. de Oliveira, R. J. G. B. de Queiroz & V. de Paiva - 2014 - Logic Journal of the IGPL 22 (2):274-285.
    The geometric system of deduction called N-Graphs was introduced by de Oliveira in 2001. The proofs in this system are represented by means of digraphs and, while its derivations are mostly based on Gentzen's sequent calculus, the system gets its inspiration from geometrically based systems, such as the Kneales' tables of development, Statman's proofs-as-graphs, Buss' logical flow graphs, and Girard's proof-nets. Given that all these geometric systems appeal to the classical symmetry between premises and conclusions, providing an intuitionistic version of (...)
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  • The cost of a cycle is a square.A. Carbone - 2002 - Journal of Symbolic Logic 67 (1):35-60.
    The logical flow graphs of sequent calculus proofs might contain oriented cycles. For the predicate calculus the elimination of cycles might be non-elementary and this was shown in [Car96]. For the propositional calculus, we prove that if a proof of k lines contains n cycles then there exists an acyclic proof with O(k n+l ) lines. In particular, there is a polynomial time algorithm which eliminates cycles from a proof. These results are motivated by the search for general methods on (...)
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  • A Note on the Length of Proofs.Tsuyoshi Yukami - 1994 - Annals of the Japan Association for Philosophy of Science 8 (4):203-209.
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  • Interpolants, cut elimination and flow graphs for the propositional calculus.Alessandra Carbone - 1997 - Annals of Pure and Applied Logic 83 (3):249-299.
    We analyse the structure of propositional proofs in the sequent calculus focusing on the well-known procedures of Interpolation and Cut Elimination. We are motivated in part by the desire to understand why a tautology might be ‘hard to prove’. Given a proof we associate to it a logical graph tracing the flow of formulas in it . We show some general facts about logical graphs such as acyclicity of cut-free proofs and acyclicity of contraction-free proofs , and we give a (...)
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  • Generalizing proofs in monadic languages.Matthias Baaz & Piotr Wojtylak - 2008 - Annals of Pure and Applied Logic 154 (2):71-138.
    This paper develops a proof theory for logical forms of proofs in the case of monadic languages. Among the consequences are different kinds of generalization of proofs in various schematic proof systems. The results use suitable relations between logical properties of partial proof data and algebraic properties of corresponding sets of linear diophantine equations.
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  • Turning cycles into spirals.A. Carbone - 1999 - Annals of Pure and Applied Logic 96 (1-3):57-73.
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  • The Role of Structural Reasoning in the Genesis of Graph Theory.Michael Arndt - 2019 - History and Philosophy of Logic 40 (3):266-297.
    The seminal book on graph theory by Dénes Kőnig, published in the year 1936, collected notions and results from precursory works from the mid to late nineteenth century by Hamilton, Cayley, Sylvester and others. More importantly, Kőnig himself contributed many of his own results that he had obtained in the more than twenty years that he had been working on this subject matter. What is noteworthy is the fact that the fundamentals of what he calls directed graphs are taken almost (...)
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  • Some remarks on lengths of propositional proofs.Samuel R. Buss - 1995 - Archive for Mathematical Logic 34 (6):377-394.
    We survey the best known lower bounds on symbols and lines in Frege and extended Frege proofs. We prove that in minimum length sequent calculus proofs, no formula is generated twice or used twice on any single branch of the proof. We prove that the number of distinct subformulas in a minimum length Frege proof is linearly bounded by the number of lines. Depthd Frege proofs ofm lines can be transformed into depthd proofs ofO(m d+1) symbols. We show that renaming (...)
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  • Bounded arithmetic, proof complexity and two papers of Parikh.Samuel R. Buss - 1999 - Annals of Pure and Applied Logic 96 (1-3):43-55.
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  • Logical structures and genus of proofs.Alessandra Carbone - 2010 - Annals of Pure and Applied Logic 161 (2):139-149.
    Any arbitrarily complicated non-oriented graph, that is a graph of arbitrarily large genus, can be encoded in a cut-free proof. This unpublished result of Statman was shown in the early seventies. We provide a proof of it, and of a number of other related facts.
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