Abstract
This paper introduces an expressive class of indexed quotient-inductive
types, called QWI types, within the framework of constructive type theory. They
are initial algebras for indexed families of equational theories with possibly
infinitary operators and equations. We prove that QWI types can be derived from
quotient types and inductive types in the type theory of toposes with natural
number object and universes, provided those universes satisfy the Weakly
Initial Set of Covers (WISC) axiom. We do so by constructing QWI types as
colimits of a family of approximations to them defined by well-founded
recursion over a suitable notion of size, whose definition involves the WISC
axiom. We developed the proof and checked it using the Agda theorem prover.
Publisher
Centre pour la Communication Scientifique Directe (CCSD)
Subject
General Computer Science,Theoretical Computer Science
Cited by
4 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. Algebraic Effects Meet Hoare Logic in Cubical Agda;Proceedings of the ACM on Programming Languages;2024-01-05
2. Decalf: A Directed, Effectful Cost-Aware Logical Framework;Proceedings of the ACM on Programming Languages;2024-01-05
3. A class of higher inductive types in Zermelo‐Fraenkel set theory;Mathematical Logic Quarterly;2022-01-21
4. A cost-aware logical framework;Proceedings of the ACM on Programming Languages;2022-01-12