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Reducibility of domain representations and Cantor–Weihrauch domain representations

Jens Blanck Orcid Logo

Mathematical Structures in Computer Science, Volume: 18, Issue: 06, Pages: 1031 - 1056

Swansea University Author: Jens Blanck Orcid Logo

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DOI (Published version): 10.1017/S0960129508007093

Abstract

The paper looks at the spectrum of available domain representations of topological spaces. The spectrum is analysed via the notion of domain reducibility. This concept is related to the notion of reductions from TTE, and in fact all TTE representations (here referred to as Cantor-Weihrauch domain re...

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Published in: Mathematical Structures in Computer Science
ISSN: 0960-1295 1469-8072
Published: 2008
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URI: https://cronfa.swan.ac.uk/Record/cronfa132
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last_indexed 2018-02-09T04:26:58Z
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spelling 2015-10-14T16:23:45.6483910 v2 132 2012-02-23 Reducibility of domain representations and Cantor–Weihrauch domain representations 704f3ce6b65d931e1a86a03e9e30d639 0000-0001-9656-1352 Jens Blanck Jens Blanck true false 2012-02-23 SCS The paper looks at the spectrum of available domain representations of topological spaces. The spectrum is analysed via the notion of domain reducibility. This concept is related to the notion of reductions from TTE, and in fact all TTE representations (here referred to as Cantor-Weihrauch domain representations) and their reductions form a sub-spectrum of all available domain representations. Journal Article Mathematical Structures in Computer Science 18 06 1031 1056 0960-1295 1469-8072 3 9 2008 2008-09-03 10.1017/S0960129508007093 COLLEGE NANME Computer Science COLLEGE CODE SCS Swansea University 2015-10-14T16:23:45.6483910 2012-02-23T17:01:54.0000000 Faculty of Science and Engineering School of Mathematics and Computer Science - Computer Science Jens Blanck 0000-0001-9656-1352 1
title Reducibility of domain representations and Cantor–Weihrauch domain representations
spellingShingle Reducibility of domain representations and Cantor–Weihrauch domain representations
Jens Blanck
title_short Reducibility of domain representations and Cantor–Weihrauch domain representations
title_full Reducibility of domain representations and Cantor–Weihrauch domain representations
title_fullStr Reducibility of domain representations and Cantor–Weihrauch domain representations
title_full_unstemmed Reducibility of domain representations and Cantor–Weihrauch domain representations
title_sort Reducibility of domain representations and Cantor–Weihrauch domain representations
author_id_str_mv 704f3ce6b65d931e1a86a03e9e30d639
author_id_fullname_str_mv 704f3ce6b65d931e1a86a03e9e30d639_***_Jens Blanck
author Jens Blanck
author2 Jens Blanck
format Journal article
container_title Mathematical Structures in Computer Science
container_volume 18
container_issue 06
container_start_page 1031
publishDate 2008
institution Swansea University
issn 0960-1295
1469-8072
doi_str_mv 10.1017/S0960129508007093
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
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active_str 0
description The paper looks at the spectrum of available domain representations of topological spaces. The spectrum is analysed via the notion of domain reducibility. This concept is related to the notion of reductions from TTE, and in fact all TTE representations (here referred to as Cantor-Weihrauch domain representations) and their reductions form a sub-spectrum of all available domain representations.
published_date 2008-09-03T03:02:54Z
_version_ 1763749474474131456
score 11.035634

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