Definitional equality—or conversion—for a type theory with a decidable type checking is the simplest tool to prove that two objects are the same, letting the system decide just using computation. Therefore, the more things are equal by conversion, the simpler it is to use a language based on type theory. Proof-irrelevance, stating that any two proofs of the same proposition are equal, is a possible way to extend conversion to make a type theory more powerful. However, this new power comes at a price if we integrate it naively, either by making type checking undecidable or by realizing new axioms—such as uniqueness of identity proofs (UIP)—that are incompatible with other extensions, such as univalence. In this paper, taking inspiration from homotopy type theory, we propose a general way to extend a type theory with definitional proof irrelevance, in a way that keeps type checking decidable and is compatible with univalence. We provide a new criterion to decide whether a proposition can be eliminated over a type (correcting and improving the so-called singleton elimination of Coq) by using techniques coming from recent development on dependent pattern matching without UIP. We show the generality of our approach by providing implementations for both Coq and Agda, both of which are planned to be integrated in future versions of those proof assistants.
slides of the presentation (sprop_popl_19.pdf) | 4.25MiB |
Fri 18 JanDisplayed time zone: Belfast change
10:35 - 12:03 | |||
10:35 22mTalk | Higher Inductive Types in Cubical Computational Type Theory Research Papers Link to publication DOI Pre-print Media Attached File Attached | ||
10:57 22mTalk | Constructing Quotient Inductive-Inductive Types Research Papers Thorsten Altenkirch University of Nottingham, Ambrus Kaposi University of Nottingham, András Kovács Eötvös Loránd University Link to publication DOI Media Attached File Attached | ||
11:19 22mTalk | Definitional Proof-Irrelevance without K Research Papers Gaetan Gilbert , Jesper Cockx Chalmers | University of Gothenburg, Matthieu Sozeau Inria, Nicolas Tabareau Inria Link to publication DOI Media Attached File Attached | ||
11:41 22mTalk | Bisimulation as Path Type for Guarded Recursive Types Research Papers Link to publication DOI Media Attached File Attached |