Rational enriched motivic spaces

Bonart, Peter

doi:10.1016/j.jalgebra.2024.05.034

Journal article 205 views 17 downloads

Rational enriched motivic spaces

Peter Bonart

Journal of Algebra, Volume: 657, Pages: 704 - 747

Swansea University Author: Peter Bonart

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DOI (Published version): 10.1016/j.jalgebra.2024.05.034

Abstract

Enriched motivic -spaces are introduced and studied in this paper, where is an additive category of correspondences. They are linear counterparts of motivic Γ-spaces. It is shown that rational special enriched motivic -spaces recover connective motivic bispectra with rational coefficients, where is...

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Published in:	Journal of Algebra
ISSN:	0021-8693
Published:	Elsevier BV 2024
Online Access:	Check full text
URI:	https://cronfa.swan.ac.uk/Record/cronfa66715

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last_indexed	2024-11-25T14:18:42Z
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spelling	2024-06-27T15:28:20.7530167 v2 66715 2024-06-12 Rational enriched motivic spaces ed197f48be683f75e2f9713eb6aad94f Peter Bonart Peter Bonart true false 2024-06-12 MACS Enriched motivic -spaces are introduced and studied in this paper, where is an additive category of correspondences. They are linear counterparts of motivic Γ-spaces. It is shown that rational special enriched motivic -spaces recover connective motivic bispectra with rational coefficients, where is the category of Milnor–Witt correspondences. Journal Article Journal of Algebra 657 704 747 Elsevier BV 0021-8693 Rational motivic stable homotopy theory; motivic Γ-spaces; enriched category theory 1 11 2024 2024-11-01 10.1016/j.jalgebra.2024.05.034 COLLEGE NANME Mathematics and Computer Science School COLLEGE CODE MACS Swansea University SU Library paid the OA fee (TA Institutional Deal) Supported by the Swansea Science Doctoral Training Partnerships, and the Engineering and Physical Sciences Research Council (Project Reference: 2484592). 2024-06-27T15:28:20.7530167 2024-06-12T17:28:37.8996824 Faculty of Science and Engineering School of Mathematics and Computer Science - Mathematics Peter Bonart 1 66715__30771__ca91bcfdee9846ca8f036f77ff64e660.pdf 66715.VoR.pdf 2024-06-27T15:26:26.5265956 Output 665948 application/pdf Version of Record true © 2024 The Author(s). This is an open access article under the CC BY license. true eng http://creativecommons .org /licenses /by /4 .0/
title	Rational enriched motivic spaces
spellingShingle	Rational enriched motivic spaces Peter Bonart
title_short	Rational enriched motivic spaces
title_full	Rational enriched motivic spaces
title_fullStr	Rational enriched motivic spaces
title_full_unstemmed	Rational enriched motivic spaces
title_sort	Rational enriched motivic spaces
author_id_str_mv	ed197f48be683f75e2f9713eb6aad94f
author_id_fullname_str_mv	ed197f48be683f75e2f9713eb6aad94f_***_Peter Bonart
author	Peter Bonart
author2	Peter Bonart
format	Journal article
container_title	Journal of Algebra
container_volume	657
container_start_page	704
publishDate	2024
institution	Swansea University
issn	0021-8693
doi_str_mv	10.1016/j.jalgebra.2024.05.034
publisher	Elsevier BV
college_str	Faculty of Science and Engineering
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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 - Mathematics{{{_:::_}}}Faculty of Science and Engineering{{{_:::_}}}School of Mathematics and Computer Science - Mathematics
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description	Enriched motivic -spaces are introduced and studied in this paper, where is an additive category of correspondences. They are linear counterparts of motivic Γ-spaces. It is shown that rational special enriched motivic -spaces recover connective motivic bispectra with rational coefficients, where is the category of Milnor–Witt correspondences.
published_date	2024-11-01T08:25:42Z
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score	11.047674

Rational enriched motivic spaces

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