Linearization of Finite Elasticity with Surface Tension

0619299 20250430114935.820250429235959.9 105002802860 001462609200001 10.1007/s00332-025-10156-5 Linearization of Finite Elasticity with Surface Tension 30 s. P cav_un_epca*02539370938-8974Journal of Nonlinear Science35Springer Linearization Hyperelasticity Variational methods Gamma convergence cav_un_auth*0101142 Kružík Martin UTIA-B Matematická teorie rozhodování Department of Decision Making Theory MTR MTR K Ústav teorie informace a automatizace AV ČR, v. v. i. cav_un_auth*0374842 Mainini E. IT https://library.utia.cas.cz/separaty/2025/MTR/kruzik-0619299.pdf https://link.springer.com/article/10.1007/s00332-025-10156-5 GF21-06569K GA ČR cav_un_auth*0412957 GA23-04766S GA ČR CZ cav_un_auth*0459138 LL2310 GA MŠk CZ cav_un_auth*0487205 (ROBOPROX) CZ.02.01.01/00/22 008/0004590 GA MŠk CZ cav_un_auth*0487206 Weproposemodelsinnonlinearelasticityfor nonsimplematerials that include surface energy terms. Additionally, we also discuss living surface loads on the boundary. We establish corresponding linearized models and show their relationship to the original ones by means of Gamma convergence WOS BA 10000 10100 10102 2026 2 RVO:67985556 https://hdl.handle.net/11104/0366065 S 63 A MATHEMATICS.APPLIED|MECHANICS|PHYSICS.MATHEMATICAL 2.9 0.7 6.4 0.00521 1.336 3183 70 1.272 45.57 2.54 819 Q1 2.500 113 Q1 77.7 1.05 Q1 90 2025 105002802860 SCOPUS PUBMED 001462609200001 WOS cav_un_epca*0253937 Journal of Nonlinear Science Roč. 35 č. 1 2025 0938-8974 1432-1467 Springer