In this paper we present an asymptotic analysis of the three-dimensional problem for a thin linearly elastic cantilever Omega_ε = omega_ε × (0, l) with rectangular cross-section omega_ε of sides ε and ε^2, as ε goes to zero. Under suitable assumptions on the given loads, we show that the three-dimensional problem converges in a variational sense to the classical one-dimensional model for extension, flexure and torsion of thin-walled beams.
Thin-walled beams: the case of an open multi-rectangular cross-section / L., Freddi; A., Morassi; Paroni, Roberto. - In: JOURNAL OF ELASTICITY. - ISSN 0374-3535. - 86:(2007), pp. 263-296.
Thin-walled beams: the case of an open multi-rectangular cross-section
PARONI, Roberto
2007-01-01
Abstract
In this paper we present an asymptotic analysis of the three-dimensional problem for a thin linearly elastic cantilever Omega_ε = omega_ε × (0, l) with rectangular cross-section omega_ε of sides ε and ε^2, as ε goes to zero. Under suitable assumptions on the given loads, we show that the three-dimensional problem converges in a variational sense to the classical one-dimensional model for extension, flexure and torsion of thin-walled beams.File in questo prodotto:
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