An interpretation of martin‐löf's constructive theory of types in elementary topos theory

Mathematical Logic Quarterly 38 (1):213-240 (1992)
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Abstract

We give a formal interpretation of Martin-Löf's Constructive Theory of Types in Elementary Topos Theory which is presented as a formalised theory with intensional equality of objects. Types are interpreted as arrows and variables as sections of their types. This is necessary to model correctly the working of the assumption x ∈ A. Then intensional equality interprets equality of types. The normal form theorem which asserts that the interpretation of a type is intensional equal to the pullback of its “alignment” along some “base” arrow relates this interpretation to categorical semantic of types

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10.1002/malq.19920380118

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Conditional theories.M. R. Donnadieu & C. Rambaud - 1986 - Studia Logica 45 (3):237 - 250.

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