ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS

FERNÀNDEZ-VALÈNCIA, RAMSÈS; Giansiracusa, Jeffrey

doi:10.1017/S0017089516000653

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ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS

RAMSÈS FERNÀNDEZ-VALÈNCIA, Jeffrey Giansiracusa

Glasgow Mathematical Journal, Volume: 60, Issue: 01, Pages: 187 - 198

Swansea University Author: Jeffrey Giansiracusa

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DOI (Published version): 10.1017/S0017089516000653

Abstract

We study the homological algebra of bimodules over involutive associative algebras. We show that Braun’s definition of involutive Hochschild cohomology in terms of the complex of involution-preserving derivations is indeed computing a derived functor: the Z/2-invariants intersected with the center....

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Published in:	Glasgow Mathematical Journal
ISSN:	0017-0895 1469-509X
Published:	Cambridge University Press 2018
Online Access:	Check full text
URI:	https://cronfa.swan.ac.uk/Record/cronfa30925
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first_indexed	2016-11-04T05:30:19Z
last_indexed	2021-02-24T03:47:52Z
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spelling	2021-02-23T14:10:23.0393591 v2 30925 2016-11-03 ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS 03c4f93e1b94af60eb0c18c892b0c1d9 Jeffrey Giansiracusa Jeffrey Giansiracusa true false 2016-11-03 FGSEN We study the homological algebra of bimodules over involutive associative algebras. We show that Braun’s definition of involutive Hochschild cohomology in terms of the complex of involution-preserving derivations is indeed computing a derived functor: the Z/2-invariants intersected with the center. We then introduce the corresponding involutive Hochschild homology theory and describe it as the derived functor of the pushout of Z/2-coinvariants and abelianization. Journal Article Glasgow Mathematical Journal 60 01 187 198 Cambridge University Press 0017-0895 1469-509X Hochschild homology, involution, involutive algebras, bimodules 31 12 2018 2018-12-31 10.1017/S0017089516000653 COLLEGE NANME Science and Engineering - Faculty COLLEGE CODE FGSEN Swansea University 2021-02-23T14:10:23.0393591 2016-11-03T21:30:45.3401905 Faculty of Science and Engineering School of Mathematics and Computer Science - Mathematics RAMSÈS FERNÀNDEZ-VALÈNCIA 1 Jeffrey Giansiracusa 2 0030925-03112016213150.pdf GMJ-15.0128.R1.pdf 2016-11-03T21:31:50.4570000 Output 181271 application/pdf Accepted Manuscript true 2017-08-07T00:00:00.0000000 true
title	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS
spellingShingle	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS Jeffrey Giansiracusa
title_short	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS
title_full	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS
title_fullStr	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS
title_full_unstemmed	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS
title_sort	ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS
author_id_str_mv	03c4f93e1b94af60eb0c18c892b0c1d9
author_id_fullname_str_mv	03c4f93e1b94af60eb0c18c892b0c1d9_***_Jeffrey Giansiracusa
author	Jeffrey Giansiracusa
author2	RAMSÈS FERNÀNDEZ-VALÈNCIA Jeffrey Giansiracusa
format	Journal article
container_title	Glasgow Mathematical Journal
container_volume	60
container_issue	01
container_start_page	187
publishDate	2018
institution	Swansea University
issn	0017-0895 1469-509X
doi_str_mv	10.1017/S0017089516000653
publisher	Cambridge University Press
college_str	Faculty of Science and Engineering
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hierarchy_top_title	Faculty of Science and Engineering
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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	We study the homological algebra of bimodules over involutive associative algebras. We show that Braun’s definition of involutive Hochschild cohomology in terms of the complex of involution-preserving derivations is indeed computing a derived functor: the Z/2-invariants intersected with the center. We then introduce the corresponding involutive Hochschild homology theory and describe it as the derived functor of the pushout of Z/2-coinvariants and abelianization.
published_date	2018-12-31T03:37:42Z
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ON THE HOCHSCHILD HOMOLOGY OF INVOLUTIVE ALGEBRAS

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