The behavior of a curved thin film made of a nonsimple grade two material isdescribed by a nonconvex bulk energy depending on the first and second order derivatives of the deformation. We show usingΓ-convergence arguments that the quasiminimizers of the three-dimensional energy converge, when the thickness of the curvedfilm vanishes, to the minimizers of an energy which is a function of a two-dimensional deformation and of a Cosserat vector. Partof the energy density is obtained by A-quasiconvexification arguments.
Films courbés composés d'un matériaux non simple de second grade / Gargiulo, G; Zappale, Elvira; Zorgati, H.. - In: COMPTES RENDUS MATHÉMATIQUE. - ISSN 1631-073X. - 344:(2007), pp. 343-347.
Films courbés composés d'un matériaux non simple de second grade
ZAPPALE, ELVIRA
;
2007
Abstract
The behavior of a curved thin film made of a nonsimple grade two material isdescribed by a nonconvex bulk energy depending on the first and second order derivatives of the deformation. We show usingΓ-convergence arguments that the quasiminimizers of the three-dimensional energy converge, when the thickness of the curvedfilm vanishes, to the minimizers of an energy which is a function of a two-dimensional deformation and of a Cosserat vector. Partof the energy density is obtained by A-quasiconvexification arguments.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
