In this article, the static and free vibration analysis of doubly-curved laminated shells is performed by radial basis functions collocation. The Reissner Mixed Variational Theorem (RMVT) via a Unified Formulation by Carrera is applied in order to obtain the equations of motion and the natural boundary conditions. The present theory accounts for through-the-thickness deformation, and directly computes displacements and transverse stresses in each interface of the laminate.
A radial basis functions solution for the analysis of laminated doubly-curved shells by a Reissner-Mixed Variational Theorem / Ferreira, A. J. M.; Carrera, E.; Cinefra, M.; Zenkour, A. M.. - In: MECHANICS OF ADVANCED MATERIALS AND STRUCTURES. - ISSN 1537-6494. - 23:9(2016), pp. 1068-1079. [10.1080/15376494.2015.1121557]
A radial basis functions solution for the analysis of laminated doubly-curved shells by a Reissner-Mixed Variational Theorem
Cinefra M.;
2016-01-01
Abstract
In this article, the static and free vibration analysis of doubly-curved laminated shells is performed by radial basis functions collocation. The Reissner Mixed Variational Theorem (RMVT) via a Unified Formulation by Carrera is applied in order to obtain the equations of motion and the natural boundary conditions. The present theory accounts for through-the-thickness deformation, and directly computes displacements and transverse stresses in each interface of the laminate.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
