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Remarks on Barr’s Theorem: Proofs in Geometric Theories

In Peter Schuster & Dieter Probst (eds.), Concepts of Proof in Mathematics, Philosophy, and Computer Science. Boston: De Gruyter. pp. 347-374 (2016)

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  1. Glivenko sequent classes and constructive cut elimination in geometric logics.Giulio Fellin, Sara Negri & Eugenio Orlandelli - 2023 - Archive for Mathematical Logic 62 (5):657-688.
    A constructivisation of the cut-elimination proof for sequent calculi for classical, intuitionistic and minimal infinitary logics with geometric rules—given in earlier work by the second author—is presented. This is achieved through a procedure where the non-constructive transfinite induction on the commutative sum of ordinals is replaced by two instances of Brouwer’s Bar Induction. The proof of admissibility of the structural rules is made ordinal-free by introducing a new well-founded relation based on a notion of embeddability of derivations. Additionally, conservativity for (...)
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  • Preservation of choice principles under realizability.Eman Dihoum & Michael Rathjen - 2019 - Logic Journal of the IGPL 27 (5):746-765.
    Especially nice models of intuitionistic set theories are realizability models $V$, where $\mathcal A$ is an applicative structure or partial combinatory algebra. This paper is concerned with the preservation of various choice principles in $V$ if assumed in the underlying universe $V$, adopting Constructive Zermelo–Fraenkel as background theory for all of these investigations. Examples of choice principles are the axiom schemes of countable choice, dependent choice, relativized dependent choice and the presentation axiom. It is shown that any of these axioms (...)
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  • The Gödel-McKinsey-Tarski embedding for infinitary intuitionistic logic and its extensions.Matteo Tesi & Sara Negri - 2023 - Annals of Pure and Applied Logic 174 (8):103285.
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