Inductive Continuity via Brouwer Trees

Liron Cohen; Bruno Da Rocha Paiva; Vincent Rahli; Ayberk Tosun

doi:10.4230/LIPIcs.MFCS.2023.37

Inductive Continuity via Brouwer Trees

Liron Cohen, Bruno Da Rocha Paiva, Vincent Rahli, Ayberk Tosun

Computer Science

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

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Abstract

Continuity is a key principle of intuitionistic logic that is generally accepted by constructivists but is inconsistent with classical logic. Most commonly, continuity states that a function from the Baire space to numbers, only needs approximations of the points in the Baire space to compute. More recently, another formulation of the continuity principle was put forward. It states that for any function F from the Baire space to numbers, there exists a (dialogue) tree that contains the values of F at its leaves and such that the modulus of F at each point of the Baire space is given by the length of the corresponding branch in the tree. In this paper we provide the first internalization of this "inductive" continuity principle within a computational setting. Concretely, we present a class of intuitionistic theories that validate this formulation of continuity thanks to computations that construct such dialogue trees internally to the theories using effectful computations. We further demonstrate that this inductive continuity principle implies other forms of continuity principles.

Original language	English
Title of host publication	48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023)
Editors	Jérôme Leroux, Sylvian Lombardy, David Peleg
Publisher	Schloss Dagstuhl
Pages	37:1-37:16
Number of pages	16
ISBN (Electronic)	9783959772921
DOIs	https://doi.org/10.4230/LIPIcs.MFCS.2023.37
Publication status	Published - 21 Aug 2023
Event	48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023) - Bordeaux, France Duration: 28 Aug 2023 → 1 Sept 2023 Conference number: 48 https://mfcs2023.labri.fr/

Publication series

Name	Leibniz International Proceedings in Informatics
Publisher	Schloss-Dagstuhl - Leibniz Zentrum für Informatik
Volume	272
ISSN (Electronic)	1868-8969

Conference

Conference	48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023)
Abbreviated title	MFCS
Country/Territory	France
City	Bordeaux
Period	28/08/23 → 1/09/23
Internet address	https://mfcs2023.labri.fr/

Bibliographical note

This research was partially supported by Grant No. 2020145 from the United States-Israel Binational Science Foundation (BSF).

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CohenL2023InductiveFinal published version, 1.08 MBLicence: Creative Commons: Attribution (CC BY)

Cite this

Cohen, L., Da Rocha Paiva, B., Rahli, V., & Tosun, A. (2023). Inductive Continuity via Brouwer Trees. In J. Leroux, S. Lombardy, & D. Peleg (Eds.), 48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023) (pp. 37:1-37:16). (Leibniz International Proceedings in Informatics; Vol. 272). Schloss Dagstuhl. https://doi.org/10.4230/LIPIcs.MFCS.2023.37

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author = "Liron Cohen and {Da Rocha Paiva}, Bruno and Vincent Rahli and Ayberk Tosun",

note = "This research was partially supported by Grant No. 2020145 from the United States-Israel Binational Science Foundation (BSF).; 48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023), MFCS ; Conference date: 28-08-2023 Through 01-09-2023",

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Cohen, L, Da Rocha Paiva, B, Rahli, V & Tosun, A 2023, Inductive Continuity via Brouwer Trees. in J Leroux, S Lombardy & D Peleg (eds), 48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023). Leibniz International Proceedings in Informatics, vol. 272, Schloss Dagstuhl, pp. 37:1-37:16, 48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023), Bordeaux, France, 28/08/23. https://doi.org/10.4230/LIPIcs.MFCS.2023.37

Inductive Continuity via Brouwer Trees. / Cohen, Liron; Da Rocha Paiva, Bruno; Rahli, Vincent et al.
48th International Symposium on Mathematical Foundations of Computer Science (MFCS 2023). ed. / Jérôme Leroux; Sylvian Lombardy; David Peleg. Schloss Dagstuhl, 2023. p. 37:1-37:16 (Leibniz International Proceedings in Informatics; Vol. 272).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution

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N2 - Continuity is a key principle of intuitionistic logic that is generally accepted by constructivists but is inconsistent with classical logic. Most commonly, continuity states that a function from the Baire space to numbers, only needs approximations of the points in the Baire space to compute. More recently, another formulation of the continuity principle was put forward. It states that for any function F from the Baire space to numbers, there exists a (dialogue) tree that contains the values of F at its leaves and such that the modulus of F at each point of the Baire space is given by the length of the corresponding branch in the tree. In this paper we provide the first internalization of this "inductive" continuity principle within a computational setting. Concretely, we present a class of intuitionistic theories that validate this formulation of continuity thanks to computations that construct such dialogue trees internally to the theories using effectful computations. We further demonstrate that this inductive continuity principle implies other forms of continuity principles.

AB - Continuity is a key principle of intuitionistic logic that is generally accepted by constructivists but is inconsistent with classical logic. Most commonly, continuity states that a function from the Baire space to numbers, only needs approximations of the points in the Baire space to compute. More recently, another formulation of the continuity principle was put forward. It states that for any function F from the Baire space to numbers, there exists a (dialogue) tree that contains the values of F at its leaves and such that the modulus of F at each point of the Baire space is given by the length of the corresponding branch in the tree. In this paper we provide the first internalization of this "inductive" continuity principle within a computational setting. Concretely, we present a class of intuitionistic theories that validate this formulation of continuity thanks to computations that construct such dialogue trees internally to the theories using effectful computations. We further demonstrate that this inductive continuity principle implies other forms of continuity principles.

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ER -

Inductive Continuity via Brouwer Trees

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