通过两个算例验证了完全欧拉方程组的正确性。
The correctness of the complete Euler equation set is verified with two functional examples.
将其推广到结构优化非线性准则方程组的迭代求解,可实现结构优化迭代求解的完全自动化。
Extending it to iterative solution of structural optimization nonlinear criterion equations, complete automatization of iterative seeking solution for structural optimization can be implemented.
根据喉部沉积的传热模型建立了偏微分方程组,采用有限差分完全隐式格式进行数值分析计算。
On this heat transfer model the differential equations were based, and the finite difference complete concealed grids were used in the numerical analysis computation.
将这些方程组简化后,用于刚性明挖基础的计算,结果基底竖向应力和目前通行的计算方法完全相同。
Simplifing the equations and using them to the calculations of rigid foundations, the results of vertical pressure stresses are same completely with the traditional theory.
详细讨论、分析了涉及灾害性天气预报的理论模式的稳定性,这些模式包括:非静力完全弹性方程组、滞弹性方程组。
Stability related to theoretical model for catastrophic weather prediction that includes non-hydrostatic perfect elastic model, anelastic model was discussed and analyzed in detail.
讨论了用隐式完全守恒差分格式求解流体力学方程组,用变分原理求解热传导方程等特点。
Features of solving the hydrodynamic equations by the fully conservative implicit difference scheme and solving the thermal conductive equations by the variational method are discussed.
研究三维双曲型方程组的完全守恒差分格式。
The completely conservative difference scheme for hyperbolic differential equations in three dimensions is studied.
非线性代数方程组的求解是一个尚未完全解决的问题。
The solving of nonlinear algebraic equation system still needs further study.
文中建立了三体碰撞过程的动力学方程组,对一维完全弹性三体碰撞进行了数值实验研究。
Numerical experiment results are presented for one dimensional three-body collision dynamical equations with different masses and elastic constant.
由于决定方程组是超定的、线性的或非线性的偏微分方程组,完全求解它们非常困难。
Because the determining systems are a linear or nonlinear overdetermined PDEs, it is very hard to solve them completely.
通过两个算例验证了完全欧拉方程组的正确性。
The complete Euler equation set contains all kinds of Euler equations of the variational problems.
通过两个算例验证了完全欧拉方程组的正确性。
The complete Euler equation set contains all kinds of Euler equations of the variational problems.
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