This paper presents a model for the analysis of composite beams taking into account the overall shear deformability, warping of the slab cross section and of the steel beam and partial shear interaction between the slab and the girder. A suitable restrained displacement field is introduced by considering the longitudinal displacements given by the product of known shapes modulated by unknown functions variable along the beam axis. The warping functions are obtained by considering the problem of unrestrained thin-walled members subjected to self-equilibrated elementary load schemes. The governing equations are derived, according to the stiffness method, both in the weak and strong forms starting from the Virtual Work Theorem which makes it possible to consistently obtain the resultants of the stresses, the applied forces and the inertia involved in the problem. Some simple applications show the capacity of the model to describe displacements and stresses.
Shear deformable steel-concrete composite beam model
LEONI, Graziano
2007-01-01
Abstract
This paper presents a model for the analysis of composite beams taking into account the overall shear deformability, warping of the slab cross section and of the steel beam and partial shear interaction between the slab and the girder. A suitable restrained displacement field is introduced by considering the longitudinal displacements given by the product of known shapes modulated by unknown functions variable along the beam axis. The warping functions are obtained by considering the problem of unrestrained thin-walled members subjected to self-equilibrated elementary load schemes. The governing equations are derived, according to the stiffness method, both in the weak and strong forms starting from the Virtual Work Theorem which makes it possible to consistently obtain the resultants of the stresses, the applied forces and the inertia involved in the problem. Some simple applications show the capacity of the model to describe displacements and stresses.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.