DC Field
Value
Language
dc.contributor.author
Almi, Stefano
-
dc.contributor.author
Kružík, Martin
-
dc.contributor.author
Molchanova, Anastasia
-
dc.date.accessioned
2025-04-07T07:47:34Z
-
dc.date.available
2025-04-07T07:47:34Z
-
dc.date.issued
2025
-
dc.identifier.citation
<div class="csl-bib-body"> <div class="csl-entry">Almi, S., Kružík, M., &#38; Molchanova, A. (2025). Linearization in magnetoelasticity. <i>Advances in Calculus of Variations</i>, <i>18</i>(2), 577–591. https://doi.org/10.1515/acv-2024-0019</div> </div>
-
dc.identifier.issn
1864-8258
-
dc.identifier.uri
http://hdl.handle.net/20.500.12708/213707
-
dc.description.abstract
Starting from a model of nonlinear magnetoelasticity where magnetization is defined in the Eulerian configuration while elastic deformation is in the Lagrangian one, we rigorously derive a linearized model that coincides with the standard one that already appeared in the literature and where the zero-stress strain is quadratic in the magnetization. The relation of the nonlinear and linear model is stated in terms of the Γ-convergence and convergence of minimizers.
en
dc.description.sponsorship
FWF - Österr. Wissenschaftsfonds
-
dc.language.iso
en
-
dc.publisher
WALTER DE GRUYTER GMBH
-
dc.relation.ispartof
Advances in Calculus of Variations
-
dc.subject
Linearization
en
dc.subject
magnetoelasticity
en
dc.title
Linearization in magnetoelasticity
en
dc.type
Article
en
dc.type
Artikel
de
dc.identifier.scopus
2-s2.0-85217523504
-
dc.identifier.url
https://api.elsevier.com/content/abstract/scopus_id/85217523504
-
dc.contributor.affiliation
University of Naples Federico II, Italy
-
dc.contributor.affiliation
Czech Technical University in Prague, Czechia
-
dc.description.startpage
577
-
dc.description.endpage
591
-
dc.relation.grantno
V 1042
-
dc.type.category
Original Research Article
-
tuw.container.volume
18
-
tuw.container.issue
2
-
tuw.journal.peerreviewed
true
-
tuw.peerreviewed
true
-
wb.publication.intCoWork
International Co-publication
-
tuw.project.title
Globales und Lokales Verhalten von Deformationen
-
tuw.researchTopic.id
C4
-
tuw.researchTopic.name
Mathematical and Algorithmic Foundations
-
tuw.researchTopic.value
100
-
tuw.linking
https://www.degruyter.com/document/doi/10.1515/acv-2024-0019/html
-
dcterms.isPartOf.title
Advances in Calculus of Variations
-
tuw.publication.orgunit
E101-01-3 - Forschungsgruppe Mehrskalen Variationsrechnung
-
tuw.publisher.doi
10.1515/acv-2024-0019
-
dc.date.onlinefirst
2025
-
dc.identifier.eissn
1864-8266
-
dc.description.numberOfPages
15
-
tuw.author.orcid
0000-0001-7308-221X
-
tuw.author.orcid
0000-0003-1558-5809
-
tuw.author.orcid
0000-0003-4121-2192
-
wb.sci
true
-
wb.sciencebranch
Mathematik
-
wb.sciencebranch.oefos
1010
-
wb.sciencebranch.value
100
-
item.languageiso639-1
en
-
item.openairetype
research article
-
item.grantfulltext
none
-
item.fulltext
no Fulltext
-
item.cerifentitytype
Publications
-
item.openairecristype
http://purl.org/coar/resource_type/c_2df8fbb1
-
crisitem.author.dept
University of Naples Federico II
-
crisitem.author.dept
Czech Technical University in Prague
-
crisitem.author.dept
E101-01-3 - Forschungsgruppe Mehrskalen Variationsrechnung
-
crisitem.author.orcid
0000-0001-7308-221X
-
crisitem.author.orcid
0000-0003-1558-5809
-
crisitem.author.orcid
0000-0003-4121-2192
-
crisitem.author.parentorg
E101-01 - Forschungsbereich Analysis
-
crisitem.project.funder
FWF - Österr. Wissenschaftsfonds
-
crisitem.project.grantno
V 1042
-
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