![Logic / Mathematical logic / Mathematics / Type theory / Propositional calculus / Syntax / Predicate logic / CurryHoward correspondence / Dependent type / Lambda calculus / First-order logic / Proposition Logic / Mathematical logic / Mathematics / Type theory / Propositional calculus / Syntax / Predicate logic / CurryHoward correspondence / Dependent type / Lambda calculus / First-order logic / Proposition](https://www.pdfsearch.io/img/f4a483095e6a008930879b5fff3883dc.jpg) Date: 2011-09-02 08:06:23Logic Mathematical logic Mathematics Type theory Propositional calculus Syntax Predicate logic CurryHoward correspondence Dependent type Lambda calculus First-order logic Proposition | | logical verificationexercises 2 Exercise 1. This exercise is concerned with dependent types. We use the following definition in Coq: Inductive natlist_dep : nat -> Set := | nil_dep : natlist_dep 0Add to Reading ListSource URL: www.cs.ru.nlDownload Document from Source Website File Size: 62,96 KBShare Document on Facebook
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