Jove
Visualize
联系我们
JoVE
x logofacebook logolinkedin logoyoutube logo
关于 JoVE
概览领导团队博客JoVE 帮助中心
作者
出版流程编辑委员会范围与政策同行评审常见问题投稿
图书馆员
用户评价订阅访问资源图书馆顾问委员会常见问题
研究
JoVE JournalMethods CollectionsJoVE Encyclopedia of Experiments存档
教育
JoVE CoreJoVE BusinessJoVE Science EducationJoVE Lab Manual教师资源中心教师网站
使用条款与条件
隐私政策
政策

相关概念视频

Mechanism of Breathing II: Expiration01:23

Mechanism of Breathing II: Expiration

1.1K
The Physiology of Expiration: A Seamless Respiratory Process
Expiration, or exhaling, is a complex physiological process that begins as the inspiratory muscles begin to relax. This relaxation triggers a series of events that epitomize the efficiency of the respiratory system.
Mechanism of Expiration:
1.1K
Mechanism of Breathing I: Inspiration01:30

Mechanism of Breathing I: Inspiration

1.5K
Introduction to Inspiration: The Respiratory System in Action
The respiratory system, an essential network for breathing, comprises the conducting and respiratory zones, each playing a crucial role in the overall process of respiration. Let us explore the detailed mechanism of inspiration, or inhalation, which is the first phase of the respiratory cycle.
Pathway of Air during Inspiration
During inspiration, air enters our body through the nose or mouth and moves through the conducting zone,...
1.5K
Divergence and Stokes' Theorems01:06

Divergence and Stokes' Theorems

1.6K
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...
1.6K
Bernoulli's Equation for Flow Along a Streamline01:30

Bernoulli's Equation for Flow Along a Streamline

970
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:
970
Mechanism of Breathing III: The Accessory Muscles01:21

Mechanism of Breathing III: The Accessory Muscles

2.4K
The Role of Accessory Muscles in the Respiratory System
The respiratory system is a complex network that relies on primary respiratory muscles like the diaphragm, but also involves accessory muscles to enhance lung expansion and airflow during both inhalation and exhalation.
Enhancing Inhalation with Accessory Muscles:
Accessory muscles such as the sternocleidomastoid, scalene, intercostal, and abdominal muscles are crucial when additional respiratory effort is required, such as during deep...
2.4K
Bernoulli's Equation for Flow Normal to a Streamline01:16

Bernoulli's Equation for Flow Normal to a Streamline

861
Bernoulli's equation for flow normal to a streamline explains how pressure varies across curved streamlines due to the outward centrifugal forces induced by the fluid's curvature. The pressure is higher on the inner side of the curve, near the center of curvature, and decreases outward to balance these centrifugal forces.
The pressure difference depends on the fluid's velocity and radius of curvature. The pressure variation is minimal in flows with nearly straight streamlines.
861

您也可能阅读

相关文章

通过共同作者、期刊和引用图与本文相关的文章。

排序
Same author

Optimization of Process Parameters of Rhamnolipid Treatment of Oily Sludge Based on Response Surface Methodology.

ACS omega·2020
Same author

Safety and Long-term Scleral Biomechanical Stability of Rhesus Eyes after Scleral Cross-linking by Blue Light.

Current eye research·2020
Same author

Serum pentraxin 3 as a biomarker for prognosis of acute minor stroke due to large artery atherosclerosis.

Brain and behavior·2020
Same author

The roles of adenosine deaminase in autoimmune diseases.

Autoimmunity reviews·2020
Same author

The role of oxidative stress in association between disinfection by-products exposure and semen quality: A mediation analysis among men from an infertility clinic.

Chemosphere·2020
Same author

Establishment of immune prognostic signature and analysis of prospective molecular mechanisms in childhood osteosarcoma patients.

Medicine·2020

相关实验视频

Updated: Jul 4, 2025

Investigating the Three-dimensional Flow Separation Induced by a Model Vocal Fold Polyp
09:58

Investigating the Three-dimensional Flow Separation Induced by a Model Vocal Fold Polyp

Published on: February 3, 2014

8.5K

在矢量场中的基本和二次超常规呼吸器.

Chong Liu1,2,3,4, Shao-Chun Chen1, Nail Akhmediev2

  • 1School of Physics, Northwest University, Xi'an 710127, China.

Physical review letters
|January 26, 2024
PubMed
概括
此摘要是机器生成的。

我们在马纳科夫方程中为超常规呼吸者 (SRB) 提出了准确的理论,证实了它们在聚焦和失焦系统中的存在. 这项研究将SRB与调制不稳定性联系起来,揭示了平面波如何产生复杂的呼吸结构.

更多相关视频

Induction of Microstreaming by Nonspherical Bubble Oscillations in an Acoustic Levitation System
08:19

Induction of Microstreaming by Nonspherical Bubble Oscillations in an Acoustic Levitation System

Published on: May 9, 2021

2.2K
Breath Collection from Children for Disease Biomarker Discovery
06:09

Breath Collection from Children for Disease Biomarker Discovery

Published on: February 14, 2019

6.9K

相关实验视频

Last Updated: Jul 4, 2025

Investigating the Three-dimensional Flow Separation Induced by a Model Vocal Fold Polyp
09:58

Investigating the Three-dimensional Flow Separation Induced by a Model Vocal Fold Polyp

Published on: February 3, 2014

8.5K
Induction of Microstreaming by Nonspherical Bubble Oscillations in an Acoustic Levitation System
08:19

Induction of Microstreaming by Nonspherical Bubble Oscillations in an Acoustic Levitation System

Published on: May 9, 2021

2.2K
Breath Collection from Children for Disease Biomarker Discovery
06:09

Breath Collection from Children for Disease Biomarker Discovery

Published on: February 14, 2019

6.9K

科学领域:

  • 非线性动力学是一种非线性动力学.
  • 数学物理学的数学物理.
  • 索利顿理论是一个理论.

背景情况:

  • 马纳科夫方程描述了不同介质中的非线性波 propagation.
  • 超常规呼吸器 (SRB) 是这些系统中的特定解决方案.
  • 了解SRB对于分析复杂的波现象至关重要.

研究的目的:

  • 在马纳科夫方程中为超常规呼吸者 (SRBs) 开发一个准确的理论.
  • 调查矢量SRB在聚焦和脱焦Manakov系统中的存在.
  • 为了确定SRB和调制不稳定性之间的关系.

主要方法:

  • 马纳科夫方程的自身价值分析.
  • 准确的理论框架的发展.
  • 对平面波的初始调制效应的分析.

主要成果:

  • 证实了在对焦和失焦的Manakov系统中存在矢量SRB.
  • 在SRB和调制不稳定性之间建立了直接联系.
  • 证明局部周期调制可以激发单次和二次SRB.

结论:

  • 开发的精确理论提供了对马纳科夫系统中SRB的全面理解.
  • 已经证明SRB是调制不稳定的直接后果.
  • 复杂的SRB结构可以从简单的初始条件中生成,以集中Manakov系统.