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LICS
2012
IEEE

Foundational, Compositional (Co)datatypes for Higher-Order Logic: Category Theory Applied to Theorem Proving

12 years 2 months ago
Foundational, Compositional (Co)datatypes for Higher-Order Logic: Category Theory Applied to Theorem Proving
—Interactive theorem provers based on higher-order logic (HOL) traditionally follow the definitional approach, reducing high-level specifications to logical primitives. This also applies to the support for datatype definitions. However, the internal datatype construction used in HOL4, HOL Light, and Isabelle/ HOL is fundamentally noncompositional, limiting its efficiency and flexibility, and it does not cater for codatatypes. We present a fully modular framework for constructing (co)datatypes in HOL, with support for mixed mutual and nested (co)recursion. Mixed (co)recursion enables type definitions involving both datatypes and codatatypes, such as the type of finitely branching trees of possibly infinite depth. Our framework draws heavily from category theory. The key notion is that of a bounded natural functor—an enriched type constructor satisfying specific properties preserved by interesting categorical operations. Our ideas are implemented as a definitional package i...
Dmitriy Traytel, Andrei Popescu, Jasmin Christian
Added 29 Sep 2012
Updated 29 Sep 2012
Type Journal
Year 2012
Where LICS
Authors Dmitriy Traytel, Andrei Popescu, Jasmin Christian Blanchette
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