Noetherian Quasi-Polish spaces

Brecht, Matthew de; Pauly, Arno

doi:10.4230/LIPIcs.CSL.2017.16

Conference Paper/Proceeding/Abstract 10794 views 96 downloads

Noetherian Quasi-Polish spaces

Matthew de Brecht, Arno Pauly

26th EACSL Annual Conference on Computer Science Logic (CSL 2017), Volume: 82

Swansea University Author: Arno Pauly

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DOI (Published version): 10.4230/LIPIcs.CSL.2017.16

Abstract

In the presence of suitable power spaces, compactness of X can be characterized as the singleton {X} being open in the space O(X) of open subsets of X. Equivalently, this means that universal quantification over a compact space preserves open predicates.Using the language of represented spaces, one...

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Published in:	26th EACSL Annual Conference on Computer Science Logic (CSL 2017)
Published:	Schloss Dagstuhl 2017
Online Access:	http://drops.dagstuhl.de/opus/volltexte/2017/7698
URI:	https://cronfa.swan.ac.uk/Record/cronfa37374
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first_indexed	2017-12-12T13:49:46Z
last_indexed	2020-07-14T13:03:50Z
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spelling	2020-07-14T10:54:47.0194558 v2 37374 2017-12-08 Noetherian Quasi-Polish spaces 17a56a78ec04e7fc47b7fe18394d7245 0000-0002-0173-3295 Arno Pauly Arno Pauly true false 2017-12-08 SCS In the presence of suitable power spaces, compactness of X can be characterized as the singleton {X} being open in the space O(X) of open subsets of X. Equivalently, this means that universal quantification over a compact space preserves open predicates.Using the language of represented spaces, one can make sense of notions such as a Σ02-subset of the space of Σ02-subsets of a given space. This suggests higher-order analogues to compactness: We can, e.g.~, investigate the spaces X where {X} is a Δ02-subset of the space of Δ02-subsets of X. Call this notion ∇-compactness. As Δ02 is self-dual, we find that both universal and existential quantifier over ∇-compact spaces preserve Δ02 predicates.Recall that a space is called Noetherian iff every subset is compact. Within the setting of Quasi-Polish spaces, we can fully characterize the ∇-compact spaces: A Quasi-Polish space is Noetherian iff it is ∇-compact. Note that the restriction to Quasi-Polish spaces is sufficiently general to include plenty of examples. Conference Paper/Proceeding/Abstract 26th EACSL Annual Conference on Computer Science Logic (CSL 2017) 82 Schloss Dagstuhl Quasi-Polish, synthetic topology, Noetherian space, finitely many mindchanges 31 12 2017 2017-12-31 10.4230/LIPIcs.CSL.2017.16 http://drops.dagstuhl.de/opus/volltexte/2017/7698 COLLEGE NANME Computer Science COLLEGE CODE SCS Swansea University 2020-07-14T10:54:47.0194558 2017-12-08T13:10:20.8480397 Faculty of Science and Engineering School of Mathematics and Computer Science - Computer Science Matthew de Brecht 1 Arno Pauly 0000-0002-0173-3295 2 0037374-08122017141945.pdf 2017-pauly-debrecht-CSL.pdf 2017-12-08T14:19:45.8770000 Output 588148 application/pdf Version of Record true 2017-12-08T00:00:00.0000000 Published under a creative commons CC BY licence true eng
title	Noetherian Quasi-Polish spaces
spellingShingle	Noetherian Quasi-Polish spaces Arno Pauly
title_short	Noetherian Quasi-Polish spaces
title_full	Noetherian Quasi-Polish spaces
title_fullStr	Noetherian Quasi-Polish spaces
title_full_unstemmed	Noetherian Quasi-Polish spaces
title_sort	Noetherian Quasi-Polish spaces
author_id_str_mv	17a56a78ec04e7fc47b7fe18394d7245
author_id_fullname_str_mv	17a56a78ec04e7fc47b7fe18394d7245_***_Arno Pauly
author	Arno Pauly
author2	Matthew de Brecht Arno Pauly
format	Conference Paper/Proceeding/Abstract
container_title	26th EACSL Annual Conference on Computer Science Logic (CSL 2017)
container_volume	82
publishDate	2017
institution	Swansea University
doi_str_mv	10.4230/LIPIcs.CSL.2017.16
publisher	Schloss Dagstuhl
college_str	Faculty of Science and Engineering
hierarchytype
hierarchy_top_id	facultyofscienceandengineering
hierarchy_top_title	Faculty of Science and Engineering
hierarchy_parent_id	facultyofscienceandengineering
hierarchy_parent_title	Faculty of Science and Engineering
department_str	School of Mathematics and Computer Science - Computer Science{{{_:::_}}}Faculty of Science and Engineering{{{_:::_}}}School of Mathematics and Computer Science - Computer Science
url	http://drops.dagstuhl.de/opus/volltexte/2017/7698
document_store_str	1
active_str	0
description	In the presence of suitable power spaces, compactness of X can be characterized as the singleton {X} being open in the space O(X) of open subsets of X. Equivalently, this means that universal quantification over a compact space preserves open predicates.Using the language of represented spaces, one can make sense of notions such as a Σ02-subset of the space of Σ02-subsets of a given space. This suggests higher-order analogues to compactness: We can, e.g.~, investigate the spaces X where {X} is a Δ02-subset of the space of Δ02-subsets of X. Call this notion ∇-compactness. As Δ02 is self-dual, we find that both universal and existential quantifier over ∇-compact spaces preserve Δ02 predicates.Recall that a space is called Noetherian iff every subset is compact. Within the setting of Quasi-Polish spaces, we can fully characterize the ∇-compact spaces: A Quasi-Polish space is Noetherian iff it is ∇-compact. Note that the restriction to Quasi-Polish spaces is sufficiently general to include plenty of examples.
published_date	2017-12-31T03:47:03Z
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score	11.035634

Noetherian Quasi-Polish spaces

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