APDE:应用偏微分方程
《应用偏微分方程》(Applied Partial Differential Equations,缩写为APDE)是多学科交叉领域广泛使用的核心数学工具,尤其在物理学、工程学及金融建模中具有重要意义。该缩写形式便于学术交流与文献引用,能够有效简化专业表述并提高信息传递效率。
Applied Partial Differential Equations具体释义
Applied Partial Differential Equations的英文发音
例句
- The method of multiple scales directly applied to partial differential equations in this paper to discuss the simplified Galerkin method truncation error.
- 本文将多尺度法直接应用于偏微分方程,以讨论应用Galerkin方法截断带来的简化误差。
- Mesh generation is an essential precondition for the numerical approximate solution when finite element method, finite difference method and finite volume method are applied to solve partial differential equations.
- 在应用有限元法、有限差分法和有限体积法数值求解偏微分方程时,网格的生成是计算的先决条件。
- The theory of wavelet analysis has been successfully applied to solving partial differential equations, and some preliminary results on wavelet multilevel inversion were also given.
- 小波分析理论已被成功应用于求解偏微分方程,在小波多尺度反演方面也有了一些初步的结果。
- It is emphasized how some basically mathematical and physical theories and basic assumptions are applied to solving nonlinearly partial differential equations, such a complicated problem, in research into inverse scattering of seismic waves.
- 文中着重介绍了在地震波逆散射问题研究过程中,各种数学、物理的基本理论和基本假设是如何被应用于非线性偏微分方程这一复杂问题的求解过程的。
- Similar method may be applied in other types of partial differential equations.
- 类似的方法还可以用在其它类型的偏微分方程数值解中。
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