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相关概念视频

Travelling Waves01:04

Travelling Waves

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A wave is a disturbance that propagates from its source, repeating itself periodically, and is typically associated with simple harmonic motion. Mechanical waves are governed by Newton's laws and require a medium to travel. A medium is a substance in which a mechanical wave propagates, and the medium produces an elastic restoring force when it is deformed.
Water waves, sound waves, and seismic waves are some examples of mechanical waves. For water waves, the wave propagation medium is...
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Traveling Waves: Lossless Lines01:27

Traveling Waves: Lossless Lines

128
The provided content explores the behavior of traveling waves on single-phase lossless transmission lines. It begins with a single-phase two-wire lossless transmission line of length Δx, characterized by a loop inductance LH/m and a line-to-line capacitance C F/m. These parameters result in a series inductance LΔx  and a shunt capacitance CΔx.
128
Equations of Wave Motion01:02

Equations of Wave Motion

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Mathematically, the motion of a wave can be studied using a wavefunction. Consider a string oscillating up and down in simple harmonic motion, having a period T. The wave on the string is sinusoidal and is translated in the positive x-direction as time progresses. Sine is a function of the angle θ, oscillating between +A and −A and repeating every 2π radians. To construct a wave model, the ratio of the angle θ and the position x is considered.
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Standing Waves in a Cavity01:28

Standing Waves in a Cavity

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A household microwave and lasers are examples of standing electromagnetic waves in a cavity. When two conducting metal plates are placed parallel at the nodal planes, it creates a cavity where standing waves are formed. The cavity between the two planes is analogous to a stretched string held at the points x = 0 and x = L. Here, the distance 'L' between the two planes must be an integer multiple of half of the wavelength. The wavelengths that satisfy this condition are given by:
886
Modes of Standing Waves: II01:04

Modes of Standing Waves: II

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The starting point for expressing the modes of standing waves is understanding the boundary conditions that the waves must follow. The boundary conditions are derived from the physical understanding of how the standing waves are sustained, that is, how the vibrating particles of the medium behave at the boundaries imposed on them.
For a tube open at one end and closed at the other filled with air, the modes are such that there is always an antinode at the open end and a node at the closed end....
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Propagation of Waves01:07

Propagation of Waves

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When a wave propagates from one medium to another, part of it may get reflected in the first medium, and part of it may get transmitted to the second medium. In such a case, the interface of the two mediums can be considered as a boundary that is neither fixed nor free.
Consider a scenario where a wave propagates from a string of low linear mass density to a string of high linear mass density. In such a case, the reflected wave is out of phase with respect to the incident wave, however the...
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相关实验视频

Updated: Jun 15, 2025

Fabrication And Characterization Of Photonic Crystal Slow Light Waveguides And Cavities
11:08

Fabrication And Characterization Of Photonic Crystal Slow Light Waveguides And Cavities

Published on: November 30, 2012

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纯正的四边形移动波解决方案:一个数值研究.

Andrea Armaroli

    Optics letters
    |June 13, 2025
    PubMed
    概括

    研究人员在一个泛型非线性施罗丁格方程 (NLSE) 中探索了周期性移动波的解决方案. 他们发现了特定的参数间隔,允许由于高阶分散而在光学波导中稳定,状的光谱传播.

    科学领域:

    • 非线性光学是非线性光学.
    • 数学物理 数学物理
    • 波浪传播 波浪传播

    背景情况:

    • 非线性施罗丁格方程 (NLSE) 是各种物理系统中模拟波浪现象的基础.
    • 对于高级应用来说,了解一般化的NLSE与更高阶分散项的行为至关重要.
    • 周期性移动波溶液,特别是dn-oidal类溶液,对于描述稳定波的模式很重要.

    研究的目的:

    • 为了研究一个周期性移动波的家庭解决方案,一个纯的四边形概括非线性施罗丁格方程 (NLSE).
    • 分析这些解决方案的调制不稳定性.
    • 确定在光学波导中可以观察到稳定,正规和状的光谱传播的条件.

    主要方法:

    • 一个参数家族的dnoidal类溶液的数值计算.
    • 这些解决方案与传统的NLSE相对应解决方案进行比较.
    • 对一般化的NLSE的调制不稳定性问题的数值分析.

    主要成果:

    • 从数值上确定了一个非零平均成分的dn-oidal类溶液的单参数家族.
    • 调节性不稳定性分析揭示了一种非碎的趋势:不稳定性发生在特定的参数间隔内,由稳定性岛屿隔开.
    • 数字模拟证实了稳定的传播模式的存在.

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    Characterization of Full Set Material Constants and Their Temperature Dependence for Piezoelectric Materials Using Resonant Ultrasound Spectroscopy
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    Visually Based Characterization of the Incipient Particle Motion in Regular Substrates: From Laminar to Turbulent Conditions
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    Visually Based Characterization of the Incipient Particle Motion in Regular Substrates: From Laminar to Turbulent Conditions

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    Last Updated: Jun 15, 2025

    Fabrication And Characterization Of Photonic Crystal Slow Light Waveguides And Cavities
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    Fabrication And Characterization Of Photonic Crystal Slow Light Waveguides And Cavities

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    Characterization of Full Set Material Constants and Their Temperature Dependence for Piezoelectric Materials Using Resonant Ultrasound Spectroscopy
    07:44

    Characterization of Full Set Material Constants and Their Temperature Dependence for Piezoelectric Materials Using Resonant Ultrasound Spectroscopy

    Published on: April 27, 2016

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    Visually Based Characterization of the Incipient Particle Motion in Regular Substrates: From Laminar to Turbulent Conditions
    11:51

    Visually Based Characterization of the Incipient Particle Motion in Regular Substrates: From Laminar to Turbulent Conditions

    Published on: February 22, 2018

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    结论:

    • 光学波导中的高阶分散项使得能够观察到规律且稳定的状光谱.
    • 已识别的稳定性岛屿为控制和利用非线性系统中复杂的波浪现象提供了潜力.