On the strength of dependent products in the type theory of Martin-Löf

Annals of Pure and Applied Logic 160 (1):1-12 (2009)
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Abstract

One may formulate the dependent product types of Martin-Löf type theory either in terms of abstraction and application operators like those for the lambda-calculus; or in terms of introduction and elimination rules like those for the other constructors of type theory. It is known that the latter rules are at least as strong as the former: we show that they are in fact strictly stronger. We also show, in the presence of the identity types, that the elimination rule for dependent products–which is a “higher-order” inference rule in the sense of Schroeder-Heister–can be reformulated in a first-order manner. Finally, we consider the principle of function extensionality in type theory, which asserts that two elements of a dependent product type which are pointwise propositionally equal, are themselves propositionally equal. We demonstrate that the usual formulation of this principle fails to verify a number of very natural propositional equalities; and suggest an alternative formulation which rectifies this deficiency

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10.1016/j.apal.2008.12.003

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Richard Garner
University of Houston

Citations of this work

Eta-rules in Martin-löf type theory.Ansten Klev - 2019 - Bulletin of Symbolic Logic 25 (3):333-359.

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A natural extension of natural deduction.Peter Schroeder-Heister - 1984 - Journal of Symbolic Logic 49 (4):1284-1300.

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