Rational enriched motivic spaces

Bonart, Peter

doi:10.23889/SUthesis.64985

E-Thesis 247 views 48 downloads

Rational enriched motivic spaces / Peter Bonart

Swansea University Author: Peter Bonart

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Copyright: The Author, Peter Bonart, 2023. Distributed under the terms of a Creative Commons Attribution-ShareAlike 4.0 International License (CC BY-SA 4.0).
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DOI (Published version): 10.23889/SUthesis.64985

Abstract

Rational enriched motivic spaces are introduced and studied in this thesis to provide new models for connective and very effective motivic spectra with rational coefficients. We first study homological algebra for Grothendieck categories of functors enriched in Nisnevich sheaves with specific transf...

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Published:	Swansea, Wales, UK 2023
Institution:	Swansea University
Degree level:	Doctoral
Degree name:	Ph.D
Supervisor:	Garkusha, Grigory.
URI:	https://cronfa.swan.ac.uk/Record/cronfa64985

first_indexed	2023-11-14T11:31:23Z
last_indexed	2024-11-25T14:15:08Z
id	cronfa64985
recordtype	RisThesis
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spelling	2024-06-12T17:36:34.6943609 v2 64985 2023-11-14 Rational enriched motivic spaces ed197f48be683f75e2f9713eb6aad94f Peter Bonart Peter Bonart true false 2023-11-14 MACS Rational enriched motivic spaces are introduced and studied in this thesis to provide new models for connective and very effective motivic spectra with rational coefficients. We first study homological algebra for Grothendieck categories of functors enriched in Nisnevich sheaves with specific transfers A. Following constructions of Voevodsky for triangulated categories of motives and framed motivic-spaces, we introduce and study motivic structures on unbounded chain complexes of enriched functors yielding two new models of the triangulated category of big motives with A-tranfers DMA. We next dene enriched motivic spaces as certain enriched functors of simplicial A-sheaves. We then use the properties of enriched motivic spaces and the above reconstruction results to recover SH(k)>0,Q and SHveff(k)Q. E-Thesis Swansea, Wales, UK Triangulated categories of motives, enriched category theory, Rational motivic Gamma spaces 17 10 2023 2023-10-17 10.23889/SUthesis.64985 COLLEGE NANME Mathematics and Computer Science School COLLEGE CODE MACS Swansea University Garkusha, Grigory. Doctoral Ph.D EPSRC postgraduate research scholarship EPSRC postgraduate research scholarship 2024-06-12T17:36:34.6943609 2023-11-14T11:20:50.7548803 Faculty of Science and Engineering School of Mathematics and Computer Science - Mathematics Peter Bonart 1 64985__29012__3fbdd57e4dbb404cab3cbacdddfb301c.pdf 2023_Bonart_P.final.64985.pdf 2023-11-14T11:54:53.1818570 Output 904052 application/pdf E-Thesis – open access true Copyright: The Author, Peter Bonart, 2023. Distributed under the terms of a Creative Commons Attribution-ShareAlike 4.0 International License (CC BY-SA 4.0). true eng https://creativecommons.org/licenses/by-sa/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	E-Thesis
publishDate	2023
institution	Swansea University
doi_str_mv	10.23889/SUthesis.64985
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 - Mathematics{{{_:::_}}}Faculty of Science and Engineering{{{_:::_}}}School of Mathematics and Computer Science - Mathematics
document_store_str	1
active_str	0
description	Rational enriched motivic spaces are introduced and studied in this thesis to provide new models for connective and very effective motivic spectra with rational coefficients. We first study homological algebra for Grothendieck categories of functors enriched in Nisnevich sheaves with specific transfers A. Following constructions of Voevodsky for triangulated categories of motives and framed motivic-spaces, we introduce and study motivic structures on unbounded chain complexes of enriched functors yielding two new models of the triangulated category of big motives with A-tranfers DMA. We next dene enriched motivic spaces as certain enriched functors of simplicial A-sheaves. We then use the properties of enriched motivic spaces and the above reconstruction results to recover SH(k)>0,Q and SHveff(k)Q.
published_date	2023-10-17T08:21:03Z
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score	11.047674

Rational enriched motivic spaces / Peter Bonart

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