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相关概念视频

Poisson's And Laplace's Equation01:25

Poisson's And Laplace's Equation

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The electric potential of the system can be calculated by relating it to the electric charge densities that give rise to the electric potential. The differential form of Gauss's law expresses the electric field's divergence in terms of the electric charge density.
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Divergence and Stokes' Theorems01:06

Divergence and Stokes' Theorems

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The divergence and Stokes' theorems are a variation of Green's theorem in a higher dimension. They are also a generalization of the fundamental theorem of calculus. The divergence theorem and Stokes' theorem are in a way similar to each other; The divergence theorem relates to the dot product of a vector, while Stokes' theorem relates to the curl of a vector. Many applications in physics and engineering make use of the divergence and Stokes' theorems, enabling us to write...
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Bernoulli's Equation for Flow Along a Streamline01:30

Bernoulli's Equation for Flow Along a Streamline

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Bernoulli's equation relates the energy conservation in a fluid moving along a streamline. The equation applies to incompressible and inviscid fluids under steady flow. For such a flow, Newton's second law is applied to a small fluid element, which experiences forces due to pressure differences, gravity, and velocity variations. The force balance leads to the following form of Bernoulli's equation:
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Eulerian and Lagrangian Flow Descriptions01:22

Eulerian and Lagrangian Flow Descriptions

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Fluid flow analysis is critical in many scientific and engineering disciplines, and two principal approaches are used to describe this flow: the Eulerian and Lagrangian methods. These methods offer different perspectives on monitoring and analyzing the motion of fluids, each with distinct advantages depending on the scenario.
The Eulerian method focuses on fixed points in space where fluid properties, such as velocity, pressure, and temperature, are observed as the fluid moves between these...
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Euler's Equations of Motion01:28

Euler's Equations of Motion

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In fluid mechanics, shear stresses arise from viscosity, which represents a fluid's internal resistance to deformation. For low-viscosity fluids, like water, these stresses are minimal, simplifying flow analysis by allowing the fluid to be treated as inviscid, or frictionless. In an inviscid fluid, shear stresses are absent, leaving only normal stresses, which act perpendicularly to fluid elements. Notably, pressure — defined as the negative of the normal stress — remains uniform...
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Navier–Stokes Equations01:28

Navier–Stokes Equations

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For incompressible Newtonian fluids, where density remains constant, stresses show a linear relationship with the deformation rate, defined by normal and shear stresses. Normal stresses depend on the pressure exerted on the fluid and the rate of deformation in specific directions, which determines how fluid flows under varying pressures. Shear stresses, on the other hand, act tangentially across fluid layers. They explain how adjacent fluid layers slide relative to one another, connecting...
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相关实验视频

Updated: May 1, 2026

Experimental Investigation of Secondary Flow Structures Downstream of a Model Type IV Stent Failure in a 180° Curved Artery Test Section
11:00

Experimental Investigation of Secondary Flow Structures Downstream of a Model Type IV Stent Failure in a 180° Curved Artery Test Section

Published on: July 19, 2016

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超越拉格朗的理论:在梯度流 PDEs 中的诺瑟定理.

Nicholas C White

    Physical review. E
    |January 21, 2026
    PubMed
    概括

    诺瑟定理现在适用于非拉格朗的梯度流部分微分方程 (PDEs). 连续对称性限制了系统进化,可以产生保存量,扩大定理的实用性超出了传统的拉格朗系统.

    科学领域:

    • 数学物理 数学物理
    • 微分方程 微分方程 微分方程
    • 对称性分析对称性分析

    背景情况:

    • 诺瑟定理传统上将连续对称性与拉格朗日系中的保存量联系起来.
    • 梯度流部分微分方程 (PDEs) 在物理学中很普遍,但往往缺乏拉格朗式.
    • 在非拉格朗的PDE中分析约束和保存量是一个重大挑战.

    研究的目的:

    • 将诺瑟定理的应用扩展到非拉格朗的梯度流PDEs.
    • 为了证明连续对称性如何限制这些系统的进化.
    • 为了确定特定非拉格兰吉 PDE 的保存量.

    主要方法:

    • 将诺瑟定理应用于一个广泛的非拉格朗的梯度流PDEs类.
    • 使用薄膜方程,对称性诱导的进化约束的数值演示.
    • 对于一个单一的快速扩散方程来说,保留数量的理论导数.

    主要成果:

    • 连续对称性被证明可以限制非拉格朗日梯度流PDEs的演变.
    • 对称性诱导的约束在薄膜方程上用毛细管和范德瓦尔斯力进行了数值验证.
    • 对于单一的快速扩散方程,理论上得出了一个保存量.

    更多相关视频

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    相关实验视频

    Last Updated: May 1, 2026

    Experimental Investigation of Secondary Flow Structures Downstream of a Model Type IV Stent Failure in a 180° Curved Artery Test Section
    11:00

    Experimental Investigation of Secondary Flow Structures Downstream of a Model Type IV Stent Failure in a 180° Curved Artery Test Section

    Published on: July 19, 2016

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    The Diffusion of Passive Tracers in Laminar Shear Flow
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    Uncoupling Coriolis Force and Rotating Buoyancy Effects on Full-Field Heat Transfer Properties of a Rotating Channel
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    结论:

    • 诺瑟定理可以有效地应用于非拉格朗的梯度流PDEs.
    • 这项研究为分析这些重要方程的行为提供了一个新的工具.
    • 诺瑟定理的实用性被证明超出了其传统的拉格朗应用范围.