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

Correlation and Regression00:53

Correlation and Regression

1.9K
In statistics, correlation describes the degree of association between two variables. In the subfield of linear regression, correlation is mathematically expressed by the correlation coefficient, which describes the strength and direction of the relationship between two variables. The coefficient is symbolically represented by 'r' and ranges from -1 to +1. A positive value indicates a positive correlation where the two variables move in the same direction. A negative value suggests a...
1.9K
Coefficient of Correlation01:12

Coefficient of Correlation

6.4K
The correlation coefficient, r, developed by Karl Pearson in the early 1900s, is numerical and provides a measure of strength and direction of the linear association between the independent variable x and the dependent variable y.
If you suspect a linear relationship between x and y, then r can measure how strong the linear relationship is.
What the VALUE of r tells us:
The value of r is always between –1 and +1: –1 ≤ r ≤ 1.
The size of the correlation r indicates the...
6.4K
Multiple Regression01:25

Multiple Regression

3.2K
Multiple regression assesses a linear relationship between one response or dependent variable and two or more independent variables. It has many practical applications.
Farmers can use multiple regression to determine the crop yield based on more than one factor, such as water availability, fertilizer, soil properties, etc. Here, the crop yield is the response or dependent variable as it depends on the other independent variables. The analysis requires the construction of a scatter plot...
3.2K
Correlation of Experimental Data01:23

Correlation of Experimental Data

270
Dimensional analysis simplifies complex physical problems and guides experimental investigations, but it does not provide complete solutions. It identifies the dimensionless groups that influence a phenomenon, but experimental data is needed to establish the specific relationships and validate theoretical predictions.
For example, a spherical particle moving through a viscous fluid experiences drag. Dimensional analysis shows that the drag force depends on the particle's diameter, velocity,...
270
Regression Analysis01:11

Regression Analysis

6.0K
Regression analysis is a statistical tool that describes a mathematical relationship between a dependent variable and one or more independent variables.
In regression analysis, a regression equation is determined based on the line of best fit– a line that best fits the data points plotted in a graph. This line is also called the regression line. The algebraic equation for the regression line is called the regression equation. It is represented as:
6.0K
Coefficient of Variation01:10

Coefficient of Variation

4.2K
The coefficient of variation measures the dispersion of the data points or distribution around the mean. Using the coefficient of variation, we can compare two data series with drastically different means or different units of measurement. The coefficient of variation for a sample and a population is expressed as a percentage of the ratio of standard deviation to the mean.
The coefficient of variation is a practical statistical tool in finance. It allows investors to assess the volatility or...
4.2K

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

High-resolution mri guided whole mouse brain neuronal cell type atlas using deep learning.

Communications biology·2026
Same author

Gene-Modulated Network Diffusion for Improved Modeling of Amyloid- <math><mi>β</mi></math> Spread in Alzheimer's Disease.

bioRxiv : the preprint server for biology·2026
Same author

Brain functional-structural gradient coupling reflects development, behavior and genetic influences.

Nature communications·2026
Same author

Child Behavioral Scores Correlate With Prenatal Tobacco and Marijuana Exposure, Sociodemographic Variables and Interactions of Default Mode and Dorsal Attention Networks.

Brain and behavior·2026
Same author

High-resolution MRI Guided Whole Mouse Brain Cell Type Atlas using Deep Learning.

bioRxiv : the preprint server for biology·2025
Same author

Latent space-based network analysis for brain-behavior linking in neuroimaging.

Nature methods·2025

相关实验视频

Updated: Sep 13, 2025

Identification of Disease-related Spatial Covariance Patterns using Neuroimaging Data
14:27

Identification of Disease-related Spatial Covariance Patterns using Neuroimaging Data

Published on: June 26, 2013

15.8K

协方差对协方差的回归.

Yi Zhao1, Yize Zhao2

  • 1Department of Biostatistics and Health Data Science, Indiana University School of Medicine, 410 West 10th Street, Indianapolis, IN 46202, United States.

Biometrics
|July 31, 2025
PubMed
概括

本研究引入了一种用于分析协差矩阵的新型回归模型. 该方法有效地预测了休息状态和任务状态数据中的功能性大脑网络连接,与既定的神经科学发现保持一致.

科学领域:

  • 统计 统计 统计 统计
  • 神经成像是一种神经成像.
  • 机器学习 机器学习

背景情况:

  • 分析复杂的数据结构 (如共变矩阵) 之间的关系是具有挑战性的.
  • 现有的方法可能无法完全捕捉神经成像数据中的复杂依赖关系.
  • 了解大脑网络动态需要先进的统计建模.

研究的目的:

  • 引入一个新的协差对协差回归模型.
  • 开发一个用于识别预测和模型系数的估计器.
  • 验证模型在神经科学中的性能和适用性.

主要方法:

  • 开发一个逻辑线性模型,将共变量矩阵的投影空间中的差异联系起来.
  • 关于普通最小平方类型估计器的建议,用于同时进行投影识别和系数估计.
  • 在正规性条件下估计器的非对称一致性.

主要成果:

  • 与现有方法相比,模拟研究表明性能优越.
  • 应用到人类连接组项目 老龄化数据确定了三个关键的脑网络对.
  • 识别的网络包括全球信号,与任务相关的和与任务无关的网络.

结论:

关键词:
一个常见的对角化.一般化的线性模型.线性投影是一种线性投影.普通最小平方.

更多相关视频

Basics of Multivariate Analysis in Neuroimaging Data
06:35

Basics of Multivariate Analysis in Neuroimaging Data

Published on: July 24, 2010

17.0K
An R-Based Landscape Validation of a Competing Risk Model
05:37

An R-Based Landscape Validation of a Competing Risk Model

Published on: September 16, 2022

2.2K

相关实验视频

Last Updated: Sep 13, 2025

Identification of Disease-related Spatial Covariance Patterns using Neuroimaging Data
14:27

Identification of Disease-related Spatial Covariance Patterns using Neuroimaging Data

Published on: June 26, 2013

15.8K
Basics of Multivariate Analysis in Neuroimaging Data
06:35

Basics of Multivariate Analysis in Neuroimaging Data

Published on: July 24, 2010

17.0K
An R-Based Landscape Validation of a Competing Risk Model
05:37

An R-Based Landscape Validation of a Competing Risk Model

Published on: September 16, 2022

2.2K
  • 拟议的协差对协差回归模型对于神经成像分析是有效的.
  • 该模型成功地预测了休息状态和任务状态大脑网络之间的功能连接.
  • 研究结果支持并与当前对大脑功能组织的理解一致.