This paper addresses the static deformations analysis of functionally graded plates by collocation with radial basis functions, according to a sinusoidal shear deformation formulation for plates. The present plate theory approach accounts for through-the-thickness deformations. 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. © 2011 Elsevier Ltd. All rights reserved.
Bending of FGM plates by a sinusoidal plate formulation and collocation with radial basis functions / Neves, A. M. A.; Ferreira, A. J. M.; Carrera, E.; Roque, C. M. C.; Cinefra, M.; Jorge, R. M. N.; Soares, C. M. M.. - In: MECHANICS RESEARCH COMMUNICATIONS. - ISSN 0093-6413. - 38:5(2011), pp. 368-371. [10.1016/j.mechrescom.2011.04.011]
Bending of FGM plates by a sinusoidal plate formulation and collocation with radial basis functions
Cinefra M.;
2011-01-01
Abstract
This paper addresses the static deformations analysis of functionally graded plates by collocation with radial basis functions, according to a sinusoidal shear deformation formulation for plates. The present plate theory approach accounts for through-the-thickness deformations. 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. © 2011 Elsevier Ltd. All rights reserved.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
