Hereditary Substitution for the \lambda\Delta-Calculus
Logic in Computer Science
2013-09-06 v1 Programming Languages
Abstract
Hereditary substitution is a form of type-bounded iterated substitution, first made explicit by Watkins et al. and Adams in order to show normalization of proof terms for various constructive logics. This paper is the first to apply hereditary substitution to show normalization of a type theory corresponding to a non-constructive logic, namely the lambda-Delta calculus as formulated by Rehof. We show that there is a non-trivial extension of the hereditary substitution function of the simply-typed lambda calculus to one for the lambda-Delta calculus. Then hereditary substitution is used to prove normalization.
Keywords
Cite
@article{arxiv.1309.1256,
title = {Hereditary Substitution for the \lambda\Delta-Calculus},
author = {Harley Eades and Aaron Stump},
journal= {arXiv preprint arXiv:1309.1256},
year = {2013}
}
Comments
In Proceedings COS 2013, arXiv:1309.0924