0541516 20240103225650.220210405235959.9 85088873552 000554432600001 10.1007/s00161-020-00904-1 15 s. P cav_un_epca*02525890935-1175331 (2021)327-341Springer Magnetoelasticity Thin films Eulerian–Lagrangian cav_un_auth*0386896 Davoli E. AT K cav_un_auth*0101142 Kružík Martin UTIA-B Matematická teorie rozhodování Department of Decision Making Theory MTR MTR 25 Ústav teorie informace a automatizace AV ČR, v. v. i. cav_un_auth*0407834 Piovano P. AT 25 cav_un_auth*0316230 Stefanelli U. AT http://library.utia.cas.cz/separaty/2021/MTR/kruzik-0541516.pdf https://link.springer.com/article/10.1007/s00161-020-00904-1 8J19AT013 GA MŠk CZ cav_un_auth*0385123 GF19-29646L GA ČR CZ cav_un_auth*0385134 Starting from the three-dimensional setting, we derive a limit model of a thin magnetoelastic film by means of Γ -convergence techniques. As magnetization vectors are defined on the elastically deformed configuration, our model features both Lagrangian and Eulerian terms. This calls for qualifying admissible three-dimensional deformations of planar domains in terms of injectivity. In addition, a careful treatment of the Maxwell system in the deformed film is required. WOS BA 10000 10100 10102 2022 4 RVO:67985556 http://hdl.handle.net/11104/0319268 S 2 Article Thermodynamics|Mechanics A MECHANICS|THERMODYNAMICS 2.744 0.885 4.2 0.00293 0.591 2402 63 0.953 47.1 3.85 1001 Q1 2.799 113 Q2 64.6 Q3 Q2 0.82 Q1 64.855 2021 85088873552 SCOPUS PUBMED 000554432600001 WOS cav_un_epca*0252589 Continuum Mechanics and Thermodynamics 0935-1175 1432-0959 Roč. 33 č. 1 2021 327 341 Springer