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相关概念视频

Oscillations In An LC Circuit01:30

Oscillations In An LC Circuit

2.2K
An idealized LC circuit of zero resistance can oscillate without any source of emf by shifting the energy stored in the circuit between the electric and magnetic fields. In such an LC circuit, if the capacitor contains a charge q before the switch is closed, then all the energy of the circuit is initially stored in the electric field of the capacitor. This energy is given by
2.2K
Oscillations about an Equilibrium Position01:04

Oscillations about an Equilibrium Position

5.4K
Stability is an important concept in oscillation. If an equilibrium point is stable, a slight disturbance of an object that is initially at the stable equilibrium point will cause the object to oscillate around that point. For an unstable equilibrium point, if the object is disturbed slightly, it will not return to the equilibrium point. There are three conditions for equilibrium points—stable, unstable, and half-stable. A half-stable equilibrium point is also unstable, but is named so...
5.4K
Forced Oscillations01:06

Forced Oscillations

6.5K
When an oscillator is forced with a periodic driving force, the motion may seem chaotic. The motions of such oscillators are known as transients. After the transients die out, the oscillator reaches a steady state, where the motion is periodic, and the displacement is determined.
6.5K
Damped Oscillations01:07

Damped Oscillations

5.7K
In the real world, oscillations seldom follow true simple harmonic motion. A system that continues its motion indefinitely without losing its amplitude is termed undamped. However, friction of some sort usually dampens the motion, so it fades away or needs more force to continue. For example, a guitar string stops oscillating a few seconds after being plucked. Similarly, one must continually push a swing to keep a child swinging on a playground.
Although friction and other non-conservative...
5.7K
RLC Circuit as a Damped Oscillator01:30

RLC Circuit as a Damped Oscillator

953
An RLC circuit combines a resistor, inductor, and capacitor, connected in a series or parallel combination.
Consider a series RLC circuit. Here, the presence of resistance in the circuit leads to energy loss due to joule heating in the resistance. Therefore, the total electromagnetic energy in the circuit is no longer constant and decreases with time. Since the magnitude of charge, current, and potential difference continuously decreases, their oscillations are said to be damped. This is...
953
Entropy Change in Reversible Processes01:10

Entropy Change in Reversible Processes

2.5K
In the Carnot engine, which achieves the maximum efficiency between two reservoirs of fixed temperatures, the total change in entropy is zero. The observation can be generalized by considering any reversible cyclic process consisting of many Carnot cycles. Thus, it can be stated that the total entropy change of any ideal reversible cycle is zero.
The statement can be further generalized to prove that entropy is a state function. Take a cyclic process between any two points on a p-V diagram.
2.5K

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相关实验视频

Updated: Jun 23, 2025

A Simple Stimulatory Device for Evoking Point-like Tactile Stimuli: A Searchlight for LFP to Spike Transitions
07:34

A Simple Stimulatory Device for Evoking Point-like Tactile Stimuli: A Searchlight for LFP to Spike Transitions

Published on: March 25, 2014

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在合的洛伦茨振荡器中爆炸性过渡.

Yusra Ahmed Muthanna1,2, Haider Hasan Jafri1

  • 1Department of Physics, Aligarh Muslim University, Aligarh 202 002, India.

Physical review. E
|June 22, 2024
PubMed
概括

这项研究揭示了恒星网络上的混乱振荡器中的爆炸性同步和死亡过渡. 对称性保护导致多次爆炸事件,而对称性破坏导致单次爆炸死亡过渡.

科学领域:

  • 复杂的系统复杂的系统.
  • 非线性动力学是一种非线性动力学.
  • 网络科学 网络科学

背景情况:

  • 在合的混乱振荡器中研究同步现象对于理解复杂系统中新出现的行为至关重要.
  • 星级网络拓,具有中央枢纽和外围节点,为新兴行为研究提供了独特的动态.
  • 振荡器的不变对称性和时间尺度变化是影响过渡动态的关键因素.

研究的目的:

  • 在恒星网络上的混乱振荡器组合中分析过渡到同步.
  • 在保持对称性和破坏对称性的合条件下探索新出现的行为.
  • 了解时间尺度变化在驱动爆炸性转换中的作用.

主要方法:

  • 使用主稳定功能来分析稳定性和同步值.
  • 使用利亚普诺夫指数来量化混乱动态和同步.
  • 进行详细的稳定性分析以确定过渡点和歇斯底里.

主要成果:

  • 保持对称性的合导致连续的爆炸同步和死亡过渡与歇斯底里.
  • 由于驾驶诱导的多稳定性,出现了中间集群和间歇同步 (反同步).
  • 破坏对称性的合导致直接爆炸性死亡从振荡状态过渡.

更多相关视频

Fabrication and Testing of Microfluidic Optomechanical Oscillators
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Fabrication and Testing of Microfluidic Optomechanical Oscillators

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Generation and Coherent Control of Pulsed Quantum Frequency Combs
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Generation and Coherent Control of Pulsed Quantum Frequency Combs

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相关实验视频

Last Updated: Jun 23, 2025

A Simple Stimulatory Device for Evoking Point-like Tactile Stimuli: A Searchlight for LFP to Spike Transitions
07:34

A Simple Stimulatory Device for Evoking Point-like Tactile Stimuli: A Searchlight for LFP to Spike Transitions

Published on: March 25, 2014

9.9K
Fabrication and Testing of Microfluidic Optomechanical Oscillators
09:10

Fabrication and Testing of Microfluidic Optomechanical Oscillators

Published on: May 29, 2014

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Generation and Coherent Control of Pulsed Quantum Frequency Combs
06:42

Generation and Coherent Control of Pulsed Quantum Frequency Combs

Published on: June 8, 2018

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结论:

  • 该研究表明,基于对称性的混乱振荡器网络中存在明显的爆炸性过渡路径.
  • 网络拓和合特性显著影响同步和死亡现象.
  • 时间尺度的变化可以诱导复杂的新兴行为,如多稳定性和间歇性同步性.