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

Space-Time Curvature and the General Theory of Relativity01:17

Space-Time Curvature and the General Theory of Relativity

3.1K
In 1905, Albert Einstein published his special theory of relativity. According to this theory, no matter in the universe can attain a speed greater than the speed of light in a vacuum, which thus serves as the speed limit of the universe.
This has been verified in many experiments. However, space and time are no longer absolute. Two observers moving relative to one another do not agree on the length of objects or the passage of time. The mechanics of objects based on Newton's laws of...
3.1K
The Quantum-Mechanical Model of an Atom02:45

The Quantum-Mechanical Model of an Atom

46.3K
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.
46.3K
Aromatic Hydrocarbon Cations: Structural Overview01:18

Aromatic Hydrocarbon Cations: Structural Overview

3.0K
Cycloheptatriene is a neutral monocyclic unsaturated hydrocarbon that consists of an odd number of carbon atoms and an intervening sp3 carbon in the ring. The three double bonds in the ring correspond to 6 π electrons, which is a Huckel number, and therefore satisfies the criteria of 4n + 2 π electrons. However, the intervening sp3 carbon disrupts the continuous overlap of p orbitals. As a result, cycloheptatriene is not aromatic.
Removing one hydrogen from the intervening CH2 group...
3.0K
Gauss's Law: Cylindrical Symmetry01:20

Gauss's Law: Cylindrical Symmetry

8.1K
A charge distribution has cylindrical symmetry if the charge density depends only upon the distance from the axis of the cylinder and does not vary along the axis or with the direction about the axis. In other words, if a system varies if it is rotated around the axis or shifted along the axis, it does not have cylindrical symmetry. In real systems, we do not have infinite cylinders; however, if the cylindrical object is considerably longer than the radius from it that we are interested in,...
8.1K
2D NMR: Heteronuclear Single-Quantum Correlation Spectroscopy (HSQC)01:19

2D NMR: Heteronuclear Single-Quantum Correlation Spectroscopy (HSQC)

925
Heteronuclear single-quantum correlation spectroscopy (HSQC) is a 2D NMR technique that reveals one-bond correlations between hydrogen and a heteronucleus. The HSQC experiment is similar to the heteronuclear correlation experiment (HETCOR) but is more sensitive. In the HSQC spectrum, the proton chemical shift is plotted on the horizontal F2 axis, while the 13C chemical shift is plotted on the vertical F1 axis. The corresponding proton and 13C spectra are also shown. The HSQC contour plot does...
925
The Pauli Exclusion Principle03:06

The Pauli Exclusion Principle

50.6K
The arrangement of electrons in the orbitals of an atom is called its electron configuration. We describe an electron configuration with a symbol that contains three pieces of information:
50.6K

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

Differences Between Robin and Neumann Eigenvalues.

Communications in mathematical physics·2021
Same author

Modelling the expected probability of correct assignment under uncertainty.

Scientific reports·2020
Same author

On probability measures arising from lattice points on circles.

Mathematische annalen·2020
查看所有相关文章

相关实验视频

Updated: Sep 16, 2025

Quantum State Engineering of Light with Continuous-wave Optical Parametric Oscillators
09:23

Quantum State Engineering of Light with Continuous-wave Optical Parametric Oscillators

Published on: May 30, 2014

14.6K

对于更高维的猫地图的量子ergodicity.

Pär Kurlberg1, Alina Ostafe2, Zeev Rudnick3

  • 1Department of Mathematics, Royal Institute of Technology, 100 44 Stockholm, Sweden.

Communications in mathematical physics
|July 7, 2025
PubMed
概括
此摘要是机器生成的。

我们表明,高维猫图的固有函数对于大多数量子参数变得均分布. 这扩展了对二维系统的先前结果,为量子混乱提供了新的见解.

更多相关视频

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

9.1K
Scalable Quantum Integrated Circuits on Superconducting Two-Dimensional Electron Gas Platform
05:39

Scalable Quantum Integrated Circuits on Superconducting Two-Dimensional Electron Gas Platform

Published on: August 2, 2019

9.8K

相关实验视频

Last Updated: Sep 16, 2025

Quantum State Engineering of Light with Continuous-wave Optical Parametric Oscillators
09:23

Quantum State Engineering of Light with Continuous-wave Optical Parametric Oscillators

Published on: May 30, 2014

14.6K
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

9.1K
Scalable Quantum Integrated Circuits on Superconducting Two-Dimensional Electron Gas Platform
05:39

Scalable Quantum Integrated Circuits on Superconducting Two-Dimensional Electron Gas Platform

Published on: August 2, 2019

9.8K

科学领域:

  • 这是量子混沌.
  • 数学物理学的数学物理.
  • 数学理论是数的理论.

背景情况:

  • 猫地图是量子混沌的一个模型,由线性简易地图定义.
  • 自函数定位是量子混沌系统中的一个关键现象.
  • 之前的工作为2D猫地图建立了统一的分布.

研究的目的:

  • 在更高维的猫地图中调查自身函数定位.
  • 扩大对量子混沌模型的理解,超越两个维度.
  • 为了证明固有函数的均分布,密度为一个量子参数序列.

主要方法:

  • 使用添加组合学的工具,包括Bourgain对Mordell总和的限制.
  • 分析特定于高维猫地图的张量积结构.
  • 开发新的数学技术来处理更高维度的复杂性增加.

主要成果:

  • 证明了固有函数的均分布,对于一个密度为N的整数序列.
  • 证明了这个结果对于更高维的猫地图 (g > 1) 也适用.
  • 使用的方法与2D案例中使用的方法有很大不同.

结论:

  • 该研究成功地将自身函数分布的结果扩展到更高的维度.
  • 新的数学工具,特别是从添加组合学,对于更高维度分析至关重要.
  • 这项工作加深了对更复杂系统中的量子混沌的理解.