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Universal Constructions for (Co)Relations: categories, monoidal categories, and props

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Bibliographic Details
Published in:	Logical Methods in Computer Science
Format:	Online Article RSS Article
Published:	2018
Subjects:	Computer Science & Information Science Computer Science & IT Engineering & Technology Journal Article
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container_title	Logical Methods in Computer Science
description
discipline_display	Engineering & Technology
discipline_facet	Engineering & Technology
format	Online Article RSS Article
genre	Journal Article
id	rss_article:5905
institution	FRELIP
journal_source_facet	Logical Methods in Computer Science
publishDate	2018
publishDateSort	2018
record_format	rss_article
spellingShingle	Universal Constructions for (Co)Relations: categories, monoidal categories, and props Computer Science & Information Science Computer Science & IT Engineering & Technology
sub_discipline_display	Computer Science & IT
sub_discipline_facet	Computer Science & IT
subject_display	Computer Science & Information Science Computer Science & IT Engineering & Technology Computer Science & Information Science Computer Science & IT Engineering & Technology
subject_facet	Computer Science & Information Science Computer Science & IT Engineering & Technology
title	Universal Constructions for (Co)Relations: categories, monoidal categories, and props
title_auth	Universal Constructions for (Co)Relations: categories, monoidal categories, and props
title_full	Universal Constructions for (Co)Relations: categories, monoidal categories, and props
title_fullStr	Universal Constructions for (Co)Relations: categories, monoidal categories, and props
title_full_unstemmed	Universal Constructions for (Co)Relations: categories, monoidal categories, and props
title_short	Universal Constructions for (Co)Relations: categories, monoidal categories, and props
title_sort	universal constructions for (co)relations: categories, monoidal categories, and props
topic	Computer Science & Information Science Computer Science & IT Engineering & Technology
url	https://doi.org/10.23638/LMCS-14(3:14)2018

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Universal Constructions for (Co)Relations: categories, monoidal categories, and props

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