Data di Pubblicazione:
2005
Citazione:
A differential quadrature method solution for shear-deformable shells of revolution / Artioli, E; Gould, P L; Viola, E. - In: ENGINEERING STRUCTURES. - ISSN 0141-0296. - 27:13(2005), pp. 1879-1892. [10.1016/j.engstruct.2005.06.005]
Abstract:
This paper deals with the application of the differential quadrature method to the linear elastic static analysis of isotropic rotational
shells. The governing equations of equilibrium, in terms of stress resultants and couples, are those from Reissner–Mindlin shear deformation
shell theory. These equations, written in terms of the circular harmonic amplitudes of the stress resultants, are first put into generalized
displacements form by the use of strain–displacement relationships and constitutive equations. The resulting systems are solved by means of
the differential quadrature technique with favourable precision, leading to accurate stress patterns.
shells. The governing equations of equilibrium, in terms of stress resultants and couples, are those from Reissner–Mindlin shear deformation
shell theory. These equations, written in terms of the circular harmonic amplitudes of the stress resultants, are first put into generalized
displacements form by the use of strain–displacement relationships and constitutive equations. The resulting systems are solved by means of
the differential quadrature technique with favourable precision, leading to accurate stress patterns.
Tipologia CRIS:
Articolo su rivista
Keywords:
Shell of revolution; Differential quadrature; Static analysis
Elenco autori:
Artioli, E; Gould, P L; Viola, E
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