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相关概念视频

Poisson's And Laplace's Equation01:25

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Accurately determining beam deflection and slope under various loading conditions in structural engineering is crucial for ensuring safety and structural integrity. Singularity functions offer a streamlined approach to analyzing beams, especially when multiple loading functions complicate the bending moment equation.
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In two-dimensional incompressible fluid flow, the continuity equation is essential for ensuring mass conservation, meaning that any change in fluid entering or exiting a region is balanced by a corresponding change elsewhere. For incompressible flow, where density remains constant, this requirement simplifies to the condition that the divergence of the velocity field must be zero. Mathematically, this is expressed as,
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Shortly after de Broglie published his ideas that the electron in a hydrogen atom could be better thought of as being a circular standing wave instead of a particle moving in quantized circular orbits, Erwin Schrödinger extended de Broglie’s work by deriving what is now known as the Schrödinger equation. When Schrödinger applied his equation to hydrogen-like atoms, he was able to reproduce Bohr’s expression for the energy and, thus, the Rydberg formula governing hydrogen spectra.
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In structural analysis, singularity functions are crucial in simplifying the representation of shear forces in beams under discontinuous loading. These functions describe discontinuous  variations in shear force across a beam with varying loads by using a single mathematical expression, regardless of the complexity of the loading conditions. The singularity functions are derived from creating a free-body diagram of the beam and then making conceptual cuts at specific points to examine the...
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Synthesis of Cyclic Polymers and Characterization of Their Diffusive Motion in the Melt State at the Single Molecule Level
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费舍尔和香农函数用于高压扩散的函数.

Manuel O Cáceres1,2, Marco Nizama3, Flavia Pennini4,5

  • 1Comision Nacional de Energia Atomica, Centro Atomico Bariloche and Instituto Balseiro, Universidad Nacional de Cuyo, Av. E. Bustillo 9500, Bariloche CP 8400, Argentina.

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概括
此摘要是机器生成的。

这项研究通过使用费舍尔信息和香农来量化有限速度扩散的复杂性. 结果揭示了超标扩散中非局部和局部信息措施之间的关系.

关键词:
克莱默 - 拉奥连接渔民信息 渔民信息香农 Entropy 香农是指香农的.过度波动的扩散.电报人的方程

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科学领域:

  • 物理 物理学 物理
  • 信息理论 信息理论
  • 数学建模的数学建模

背景情况:

  • 扩散过程是各种科学领域的基础.
  • 了解这些过程的复杂性对于准确的建模至关重要.
  • 电报方程描述了一类具有有限速度的扩散过程.

研究的目的:

  • 计算有限速度扩散中的时空分布的复杂度指标.
  • 分析费舍尔的信息,香农的和电报方程的克拉梅尔-拉奥不等式.
  • 探索超级扩散中非本地和本地信息措施之间的关系.

主要方法:

  • 费舍尔信息,香农和克拉梅尔-拉奥不等式的数值计算.
  • 对电报方程的正规化解决方案的分析.
  • 开发一种扰动理论,用于长时间计算.
  • 制造一个用于短时间弹道系统分析的玩具模型.

主要成果:

  • 对电报方程的复杂度尺度的量化.
  • 证明非局部费舍尔信息 (x参数) 和局部费舍尔信息 (t参数) 之间的关系.
  • 扰动理论的应用,以确定长期的香农.
  • 系统的特征是弹道系统中的减弱波.

结论:

  • 该研究提供了有限速度扩散中复杂性的全面分析.
  • 在超标扩散框架内对信息理论措施的新见解.
  • 这些发现有助于更深入地了解扩散过程及其数学描述.