License: 
Creative Commons Attribution 3.0 Unported license (CC BY 3.0)
When quoting this document, please refer to the following
DOI: 10.4230/LIPIcs.TYPES.2016.6
URN: urn:nbn:de:0030-drops-98541
URL: http://dagstuhl.sunsite.rwth-aachen.de/volltexte/2018/9854/
Bezem, Marc ;
Coquand, Thierry ;
Nakata, Keiko ;
Parmann, Erik
Realizability at Work: Separating Two Constructive Notions of Finiteness
Abstract
We elaborate in detail a realizability model for Martin-Löf dependent type theory with the purpose to analyze a subtle distinction between two constructive notions of finiteness of a set A. The two notions are: (1) A is Noetherian: the empty list can be constructed from lists over A containing duplicates by a certain inductive shortening process; (2) A is streamless: every enumeration of A contains a duplicate.
BibTeX - Entry
@InProceedings{bezem_et_al:LIPIcs:2018:9854,
author = {Marc Bezem and Thierry Coquand and Keiko Nakata and Erik Parmann},
title = {{Realizability at Work: Separating Two Constructive Notions of Finiteness}},
booktitle = {22nd International Conference on Types for Proofs and Programs (TYPES 2016)},
pages = {6:1--6:23},
series = {Leibniz International Proceedings in Informatics (LIPIcs)},
ISBN = {978-3-95977-065-1},
ISSN = {1868-8969},
year = {2018},
volume = {97},
editor = {Silvia Ghilezan and Herman Geuvers and Jelena Ivetić},
publisher = {Schloss Dagstuhl--Leibniz-Zentrum fuer Informatik},
address = {Dagstuhl, Germany},
URL = {http://drops.dagstuhl.de/opus/volltexte/2018/9854},
URN = {urn:nbn:de:0030-drops-98541},
doi = {10.4230/LIPIcs.TYPES.2016.6},
annote = {Keywords: Type theory, realizability, constructive notions of finiteness}
}
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Keywords: |
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Type theory, realizability, constructive notions of finiteness |
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Collection: |
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22nd International Conference on Types for Proofs and Programs (TYPES 2016) |
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Issue Date: |
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2018 |
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Date of publication: |
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05.11.2018 |
