Exact Solutions of Nonlinear Micropolar Elastic Theory for Compressible Solids.
Exact Solutions of Nonlinear Micropolar Elastic Theory for Compressible Solids.
- In Recent Developments in the Theory of Shells. Springer, Cham., p.771-798, 2019 .
In this article we obtain exact solutions of finite inhomogeneous deformations of three-dimensional micropolar elastic bodies. We consider a model of the physically linear isotropic compressible material with six material parameters. The obtained solutions describe following types of finite deformations: cylindrical bending of a rectangular plate, straightening of a cylindrical sector, double cylindrical bending, pure bending of a circular cylinder sector, inflation and reversing of a hollow sphere. The results can be used to verify two-dimensional models of micropolar elastic shells.
NONLINEAR MICROPOLAR ELASTIC THEORY
In this article we obtain exact solutions of finite inhomogeneous deformations of three-dimensional micropolar elastic bodies. We consider a model of the physically linear isotropic compressible material with six material parameters. The obtained solutions describe following types of finite deformations: cylindrical bending of a rectangular plate, straightening of a cylindrical sector, double cylindrical bending, pure bending of a circular cylinder sector, inflation and reversing of a hollow sphere. The results can be used to verify two-dimensional models of micropolar elastic shells.
NONLINEAR MICROPOLAR ELASTIC THEORY