Variational methods in nonlinear elasticity: some current results on generalized convexity and relaxation
In the theory of nonlinear hyperelasticity, existence results for various boundary value problems are commonly based on direct methods of the calculus of variations. While physically reasonable material models require the corresponding energy functional to be non-convex, generalized convexity properties are, under suitable conditions, sufficient to ensure the existence of energy minimizers. Moreover, generalized convex envelopes can be employed to model complex materials exhibiting certain microstructures. Although the quasiconvex relaxation is particularly difficult to determine analytically, explicit representations are available for a growing number of subclasses of energy functions.
Referent/Referentin
Prof. Dr. Robert Martin, Universität Duisburg-Essen
Veranstalter
Institut für Angewandte Mathematik
Termin
28. Mai 202415:00 Uhr - 17:00 Uhr
Kontakt
Antje GüntherInstitut für Angewandte Mathematik
Tel.: 0511/762-3251
guenther@ifam.uni-hannover.de
Ort
Leibniz Universität HannoverGeb.: 1101
Raum: 1101.003.C311
Welfengarten 1
30167 Hannover