A theoretical investigation of an efficient numerical solution scheme to solve approximately the nonlinear Donnell equations for imperfect isotropic cylindrical shells with edge restraints and under axial compression was carried out.udud The nonlinear partial differential equations have been reduced to an equivalent set of nonlinear ordinary differential equations. The resulting two-point boundary value problem was solved, first, by using "Newton's Method of Quasilinearization" to obtain a set of linearized differential equations for the correction terms and, secondly, these differentials were approximated as finite differences to cast the linearized system of equations into the form of a block tridiagonal matrix equation. The Potters' Method solution scheme was used to solve efficiently the block tridiagonal matrix equation. By successive iterations a solution to the set of nonlinear ordinary differential equations was obtained.udud The use of this method makes it possible to investigate how the axial load level at the limit point is affected by the following factors: the choice of inplane boundary conditions, the prebuckling growth caused by the radial edge constraint, the orientation and shape of the axisymmetric and asymmetric imperfection components, and the finite length of the shell.
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机译:对有效的数值解方案进行了理论研究,该方案可以近似求解带有边约束和轴向压缩的非理想各向同性圆柱壳的非线性Donnell方程。 ud ud非线性偏微分方程已简化为非线性的等价集常微分方程。解决了由此产生的两点边值问题,首先,使用“牛顿拟线性化方法”获得了一组用于校正项的线性化微分方程,其次,将这些微分近似为有限差分,以构建线性化方程组。方程成块三对角矩阵方程的形式。使用了Potters方法的求解方案来有效地求解块三对角矩阵方程。通过逐次迭代,获得了一组非线性常微分方程的解决方案。 ud ud使用此方法可以研究极限点处的轴向载荷水平受以下因素的影响:平面内的选择边界条件,由径向边缘约束引起的预屈曲增长,轴对称和不对称缺陷组件的方向和形状以及壳体的有限长度。
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