Eliminating dependent pattern matching without K-Reference-Cited by-同舟云学术

Eliminating dependent pattern matching without K

Published:2016 Issue: Volume:26 Page:
ISSN:0956-7968
Container-title:Journal of Functional Programming
language:en
Short-container-title:J. Funct. Prog.

Author:

COCKX JESPER,DEVRIESE DOMINIQUE,PIESSENS FRANK

Abstract

AbstractDependent pattern matching is an intuitive way to write programs and proofs in dependently typed languages. It is reminiscent of both pattern matching in functional languages and case analysis in on-paper mathematics. However, in general, it is incompatible with new type theories such as homotopy type theory (HoTT). As a consequence, proofs in such theories are typically harder to write and to understand. The source of this incompatibility is the reliance of dependent pattern matching on the so-called K axiom – also known as the uniqueness of identity proofs – which is inadmissible in HoTT. In this paper, we propose a new criterion for dependent pattern matching without K, and prove it correct by a translation to eliminators in the style of Goguen et al. (2006 Algebra, Meaning, and Computation). Our criterion is both less restrictive than existing proposals, and solves a previously undetected problem in the old criterion offered by Agda. It has been implemented in Agda and is the first to be supported by a formal proof. Thus, it brings the benefits of dependent pattern matching to contexts where we cannot assume K, such as HoTT.

Publisher

Cambridge University Press (CUP)

Subject

Software

Reference42 articles.

1. The Lean Theorem Prover (System Description)

2. Cohen C. , Coquand T. , Huber S. & Mörtberg A. (2015) Cubical type theory: A constructive interpretation of the univalence axiom. http://www.cse.chalmers.se/~coquand/cubicaltt.pdf (last accessed date 09/08/2016)

3. Danielsson N.-A. (2013) Experiments related to equality. Available at: http://www.cse.chalmers.se/~nad/repos/equality/. Agda code. (last accessed date 09/08/2016)

4. Norell U. , Abel A. & Danielsson N. A. (2012) Release notes for Agda 2 version 2.3.2. Available at: http://wiki.portal.chalmers.se/agda/pmwiki.php?n=Main.Version-2-3-2. (last accessed date 09/08/2016)

5. Norell U. (2007) Towards a Practical Programming Language Based on Dependent Type Theory. PhD Thesis, Chalmers University of Technology.

Cited by 6 articles. 订阅此论文施引文献订阅此论文施引文献，注册后可以免费订阅5篇论文的施引文献，订阅后可以查看论文全部施引文献

1. On planarity of graphs in homotopy type theory;Mathematical Structures in Computer Science;2024-05-08

2. Bit-Stealing Made Legal: Compilation for Custom Memory Representations of Algebraic Data Types;Proceedings of the ACM on Programming Languages;2023-08-30

3. Datatype-generic programming meets elaborator reflection;Proceedings of the ACM on Programming Languages;2022-08-29

4. On homotopy of walks and spherical maps in homotopy type theory;Proceedings of the 11th ACM SIGPLAN International Conference on Certified Programs and Proofs;2022-01-11

5. Proof-relevant unification: Dependent pattern matching with only the axioms of your type theory;Journal of Functional Programming;2018