Asymptotic theory of Anisotropic plates and shells
A consistent theory for thin anisotropic layered structures is developed starting from asymptotic analysis of 3D equations in linear elasticity. The consideration is not restricted to the traditional boundary conditions along the faces of the structure expressed in terms of stresses, originating a n...
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| Format: | Book |
| Language: | English |
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Hackensack, New Jersey Singapore
World Scientific
[2015]
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Table of Contents:
- Plane problem for a rectangular elastic strip. technical theory for Bernoulli-Coulomb-Euler beams
- Mixed boundary value problems for single and two-layer rectangular beam. the Winkler-Fuss model
- Direct asymptotic integration of 3D elasticity equations for orthotropic plates
- Matching of the outer solution and the boundary layer for an Orthotropic plate
- Elastic plates of general Anisotropy
- Non-classical boundary value problems for Anisotropic plates
- Two-layer Anisotropic plates. the modulus of a layered foundation
- Asymptotic analysis of the outer problem for an orthotropic shell
- Boundary layer in Orthotropic shells
- Non-classical boundary value problems for Anisotropic shells
- Spatial dynamic problems for Anisotropic plates.