DC Field
Value
Language
dc.contributor.author
Aichinger, Erhard
-
dc.contributor.author
Behrisch, Mike
-
dc.contributor.author
Rossi, Bernardo
-
dc.date.accessioned
2025-04-03T11:53:49Z
-
dc.date.available
2025-04-03T11:53:49Z
-
dc.date.issued
2025-02
-
dc.identifier.citation
<div class="csl-bib-body"> <div class="csl-entry">Aichinger, E., Behrisch, M., &#38; Rossi, B. (2025). On when the union of two algebraic sets is algebraic. <i>Aequationes Mathematicae</i>, <i>99</i>(1), 107–154. https://doi.org/10.1007/s00010-024-01041-9</div> </div>
-
dc.identifier.issn
0001-9054
-
dc.identifier.uri
http://hdl.handle.net/20.500.12708/213641
-
dc.description.abstract
In universal algebraic geometry, an algebra is called an equational domain if the union of two algebraic sets is algebraic. We characterize equational domains, with respect to polynomial equations, inside congruence permutable varieties, and with respect to term equations, among all algebras of size two and all algebras of size three with a cyclic automorphism. Furthermore, for each size at least three, we prove that, modulo term equivalence, there is a continuum of equational domains of that size.
en
dc.language.iso
en
-
dc.publisher
SPRINGER BASEL AG
-
dc.relation.ispartof
Aequationes Mathematicae
-
dc.rights.uri
http://creativecommons.org/licenses/by/4.0/
-
dc.subject
universal algebraic geometry
en
dc.subject
algebraic set
en
dc.subject
equational domain
en
dc.subject
equational additivity
en
dc.subject
equationally additive clone
en
dc.title
On when the union of two algebraic sets is algebraic
en
dc.type
Article
en
dc.type
Artikel
de
dc.rights.license
Creative Commons Namensnennung 4.0 International
de
dc.rights.license
Creative Commons Attribution 4.0 International
en
dc.contributor.affiliation
Johannes Kepler University of Linz, Austria
-
dc.contributor.affiliation
Johannes Kepler University of Linz, Austria
-
dc.description.startpage
107
-
dc.description.endpage
154
-
dc.rights.holder
© The Author(s) 2024
-
dc.type.category
Original Research Article
-
tuw.container.volume
99
-
tuw.container.issue
1
-
tuw.journal.peerreviewed
true
-
tuw.peerreviewed
true
-
tuw.researchTopic.id
A3
-
tuw.researchTopic.name
Fundamental Mathematics Research
-
tuw.researchTopic.value
100
-
dcterms.isPartOf.title
Aequationes Mathematicae
-
tuw.publication.orgunit
E104-01 - Forschungsbereich Algebra
-
tuw.publisher.doi
10.1007/s00010-024-01041-9
-
dc.date.onlinefirst
2024-04-26
-
dc.identifier.eissn
1420-8903
-
dc.identifier.libraryid
AC17482410
-
dc.description.numberOfPages
48
-
tuw.author.orcid
0000-0001-8998-4138
-
tuw.author.orcid
0000-0003-0050-8085
-
tuw.author.orcid
0000-0002-0404-6634
-
dc.rights.identifier
CC BY 4.0
de
dc.rights.identifier
CC BY 4.0
en
dc.description.sponsorshipexternal
FWF
-
dc.relation.grantnoexternal
P 33878
-
wb.sci
true
-
wb.sciencebranch
Mathematik
-
wb.sciencebranch.oefos
1010
-
wb.sciencebranch.value
100
-
item.openairetype
research article
-
item.languageiso639-1
en
-
item.cerifentitytype
Publications
-
item.mimetype
application/pdf
-
item.fulltext
with Fulltext
-
item.openaccessfulltext
Open Access
-
item.grantfulltext
open
-
item.openairecristype
http://purl.org/coar/resource_type/c_2df8fbb1
-
crisitem.author.dept
Johannes Kepler University of Linz
-
crisitem.author.dept
E104-01 - Forschungsbereich Algebra
-
crisitem.author.dept
Johannes Kepler University of Linz
-
crisitem.author.orcid
0000-0001-8998-4138
-
crisitem.author.orcid
0000-0003-0050-8085
-
crisitem.author.parentorg
E104 - Institut für Diskrete Mathematik und Geometrie
-
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