有限元法特别适合于解决复杂几何结构和非均匀媒质的电磁问题。
The finite element method suits specially in the solution of complex geometry structure and the inhomogeneous medium electromagnetic problem.
绝大多数测量方法都是在非共线几何结构下测量的,在实际应用中有很大的局限性。
Most measurement methods are under the non - collinear geometry and have many limitations in applications.
裂缝油藏和非均质油藏的结构是很复杂的,往往难以描述尺度和几何形态。
It is hard to describe the scale and geometry of fracture and heterogeneous reservoirs because of their complicated structures.
该文应用具有平衡迭代格式的荷载增量法对非保守力作用下鞭天线结构的几何非线性问题进行了有限元分析;
The geometric nonlinear problem of whip antenna structure underthe action of nonconservative loads is analyzed by means of the loading incremental method which has the balanceiteration format.
通过非流形造型与基于物理的造型相结合,从拓扑结构和几何信息两个方面扩大了模型的表示范围。
Representing objects by combining non manifold modeling and physically based modeling enlarges the representing domain for both topology and geometry.
同时还引入了一个新的几何常数,并研究了它的几何性质及其与一致非方、正规结构、一致正规结构之间的关系。
Meanwhile, a new geometric constant is introduced, its properties and the relationship among uniform nonsquareness, normal structure and the constant is studied.
同时还引入了一个新的几何常数,并研究了它的几何性质及其与一致非方、正规结构、一致正规结构之间的关系。
Meanwhile, a new geometric constant is introduced, its properties and the relationship among uniform nonsquareness, normal structure and the constant is studied.
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