不可移动坐标系中杆的有限元素

Nanodesign, Technology, and Computer Simulations Pub Date : 2006-02-23 DOI:10.1117/12.726765

Y. Kharchenko

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引用次数: 1

摘要

通过用不动坐标替换伴随坐标，然后用加权差值法对带有偏导数的非线性方程进行积分，建立了轴向变形杆的有限元。所得到的有限元离散化方法为分析具有可动边界条件的长时间实测弹性固体的振荡过程提供了机会。

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Finite element of a rod in an immovable coordinate system

The finite element of rod deformed in axial direction is built by the means of substitution accompanying coordinates by immovable ones and subsequent integration of nonlinear equation with partial derivatives by method of weighted discrepancies. The worked out finite elements discretization gives opportunity to analyses oscillating processes in long-measured elastic solids with movable boundary conditions.

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Nanodesign, Technology, and Computer Simulations

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