Finitary Higher Inductive Types in the Groupoid Model
Journal article, 2018
A higher inductive type of level 1 (a 1-hit) has constructors for points and paths only, whereas a higher inductive type of level 2 (a 2-hit) has constructors for surfaces too. We restrict attention to finitary higher inductive types and present general schemata for the types of their point, path, and surface constructors. We also derive the elimination and equality rules from the types of constructors for 1-hits and 2-hits. Moreover, we construct a groupoid model for dependent type theory with 2-hits and point out that we obtain a setoid model for dependent type theory with 1-hits by truncating the groupoid model.
intuitionistic type theory
homotopy type theory
identity types
setoids
higher inductive types
groupoids
Author
Peter Dybjer
Chalmers, Computer Science and Engineering (Chalmers), Computing Science (Chalmers)
Hugo Moeneclaey
Ecole Normale Superieure (ENS)
Electronic Notes in Theoretical Computer Science
1571-0661 (ISSN)
Vol. 336 119-134Subject Categories
Computational Mathematics
Other Physics Topics
Probability Theory and Statistics
DOI
10.1016/j.entcs.2018.03.019