In this article, the static analysis of sandwich plates is performed by radial basis functions collocation, according to the Murakami's Zig-Zag function theory. The Murakami's Zig-Zag function theory accounts for through-the-thickness deformation, by considering a Zig-Zag evolution of the transverse displacement with the thickness coordinate. The equations of motion and the boundary conditions are obtained by the Carrera's unified formulation, and further interpolated by collocation with radial basis functions. © The Author(s) 2012 Reprints and permissions: sagepub.co.uk/journalsPermissions.nav.

Analysis of sandwich plates by radial basis functions collocation, according to Murakami's Zig-Zag theory / Ferreira, A. J. M.; Roque, C. M. C.; Carrera, E.; Cinefra, M.; Polit, O.. - In: JOURNAL OF SANDWICH STRUCTURES AND MATERIALS. - ISSN 1099-6362. - 14:5(2012), pp. 505-524. [10.1177/1099636212449083]

Analysis of sandwich plates by radial basis functions collocation, according to Murakami's Zig-Zag theory

Cinefra M.;
2012-01-01

Abstract

In this article, the static analysis of sandwich plates is performed by radial basis functions collocation, according to the Murakami's Zig-Zag function theory. The Murakami's Zig-Zag function theory accounts for through-the-thickness deformation, by considering a Zig-Zag evolution of the transverse displacement with the thickness coordinate. The equations of motion and the boundary conditions are obtained by the Carrera's unified formulation, and further interpolated by collocation with radial basis functions. © The Author(s) 2012 Reprints and permissions: sagepub.co.uk/journalsPermissions.nav.
2012
Analysis of sandwich plates by radial basis functions collocation, according to Murakami's Zig-Zag theory / Ferreira, A. J. M.; Roque, C. M. C.; Carrera, E.; Cinefra, M.; Polit, O.. - In: JOURNAL OF SANDWICH STRUCTURES AND MATERIALS. - ISSN 1099-6362. - 14:5(2012), pp. 505-524. [10.1177/1099636212449083]
File in questo prodotto:
Non ci sono file associati a questo prodotto.

I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.

Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11589/252360
Citazioni
  • Scopus 16
  • ???jsp.display-item.citation.isi??? 13
social impact