A Buchholz Rule for Modal Fixed Point Logics

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Logica Universalis 5 (1):1-19 (2011)
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Abstract

Buchholz’s Ω μ+1-rules provide a major tool for the proof-theoretic analysis of arithmetical inductive definitions. The aim of this paper is to put this approach into the new context of modal fixed point logic. We introduce a deductive system based on an Ω-rule tailored for modal fixed point logic and develop the basic techniques for establishing soundness and completeness of the corresponding system. In the concluding section we prove a cut elimination and collapsing result similar to that of Buchholz (Iterated inductive definitions and subsystems of analysis: recent proof theoretic studies. Lecture notes in mathematics, vol. 897, pp. 189–233, Springer, Berlin, 1981).

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10.1007/s11787-010-0022-1

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Citations of this work

Small infinitary epistemic logics.Tai-wei Hu, Mamoru Kaneko & Nobu-Yuki Suzuki - 2019 - Review of Symbolic Logic 12 (4):702-735.
Proof Theory as an Analysis of Impredicativity.Ryota Akiyoshi - 2012 - Journal of the Japan Association for Philosophy of Science 39 (2):93-107.

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References found in this work

Admissible Sets and Structures.Jon Barwise - 1978 - Studia Logica 37 (3):297-299.
Proof-theoretical analysis: weak systems of functions and classes.L. Gordeev - 1988 - Annals of Pure and Applied Logic 38 (1):1-121.

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