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A coalgebraic view of bar recursion and bar induction

Capretta, Venanzio; Uustalu, Tarmo

Authors

Tarmo Uustalu



Abstract

We reformulate the bar recursion and induction principles in terms of recursive and wellfounded coalgebras. Bar induction was originally proposed by Brouwer as an axiom to recover certain classically valid theorems in a constructive setting. It is a form of induction on non- wellfounded trees satisfying certain properties. Bar recursion, introduced later by Spector, is the corresponding function defnition principle.
We give a generalization of these principles, by introducing the notion of barred coalgebra: a process with a branching behaviour given by a functor, such that all possible computations terminate.
Coalgebraic bar recursion is the statement that every barred coalgebra is recursive; a recursive coalgebra is one that allows defnition of functions by a coalgebra-to-algebra morphism. It is a framework to characterize valid forms of recursion for terminating functional programs. One application of the principle is the tabulation of continuous functions: Ghani, Hancock and Pattinson defned a type of wellfounded trees that represent continuous functions on streams. Bar recursion allows us to prove that every stably continuous function can be tabulated to such a tree where by stability we mean that the modulus of continuity is also continuous.
Coalgebraic bar induction states that every barred coalgebra is well-founded; a wellfounded coalgebra is one that admits proof by induction.

Citation

Capretta, V., & Uustalu, T. (2016). A coalgebraic view of bar recursion and bar induction. Lecture Notes in Artificial Intelligence, 9634, 91-106. https://doi.org/10.1007/978-3-662-49630-5_6

Journal Article Type Article
Acceptance Date Dec 18, 2015
Publication Date Mar 22, 2016
Deposit Date Jun 10, 2016
Publicly Available Date Mar 28, 2024
Journal Lecture Notes in Computer Science
Electronic ISSN 0302-9743
Publisher Springer Verlag
Peer Reviewed Peer Reviewed
Volume 9634
Pages 91-106
DOI https://doi.org/10.1007/978-3-662-49630-5_6
Keywords Constructive Setting; Continuity Principle; Initial Algebra; Finite Path; Polynomial Functor
Public URL https://nottingham-repository.worktribe.com/output/779599
Publisher URL http://link.springer.com/chapter/10.1007/978-3-662-49630-5_6
Additional Information The final publication is available at Springer via http://link.springer.com/chapter/10.1007%2F978-3-662-49630-5_6

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