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Constructing Infinitary Quotient-Inductive Types

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arxiv 1911.06899 v2 pith:X446CMPF submitted 2019-11-15 cs.LO

Constructing Infinitary Quotient-Inductive Types

classification cs.LO
keywords typesqw-typesdefinitionsinfinitaryquotient-inductiveabelabstractionaccomplished
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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This paper introduces an expressive class of quotient-inductive types, called QW-types. We show that in dependent type theory with uniqueness of identity proofs, even the infinitary case of QW-types can be encoded using the combination of inductive-inductive definitions involving strictly positive occurrences of Hofmann-style quotient types, and Abel's size types. The latter, which provide a convenient constructive abstraction of what classically would be accomplished with transfinite ordinals, are used to prove termination of the recursive definitions of the elimination and computation properties of our encoding of QW-types. The development is formalized using the Agda theorem prover.

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