Jove
Visualize
Contact Us

Related Concept Videos

Attenuated Total Reflectance (ATR) Infrared Spectroscopy: Overview01:13

Attenuated Total Reflectance (ATR) Infrared Spectroscopy: Overview

Attenuated total reflectance (ATR) infrared spectroscopy is a powerful analytical technique used to study the composition of materials. It is widely employed in chemistry, materials science, forensic science, and other fields where sample characterization is required. ATR has several advantages over traditional transmission IR spectroscopy, including the requirement of little to no sample preparation and the ability to analyze a wide range of samples.
The ATR process begins by directing a beam...
Correlation of Experimental Data01:23

Correlation of Experimental Data

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, and...
Correlations02:20

Correlations

Correlation means that there is a relationship between two or more variables (such as ice cream consumption and crime), but this relationship does not necessarily imply cause and effect. When two variables are correlated, it simply means that as one variable changes, so does the other. We can measure correlation by calculating a statistic known as a correlation coefficient. A correlation coefficient is a number from -1 to +1 that indicates the strength and direction of the relationship between...
Multiple Regression01:25

Multiple Regression

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...
Calibration Curves: Correlation Coefficient01:10

Calibration Curves: Correlation Coefficient

In a linear calibration curve, there is a value called the calibration coefficient, denoted by 'r,' which measures the strength and the direction of association between two variables. The correlation coefficient value ranges from −1 to +1. A value of +1 indicates a perfect positive linear correlation, −1 denotes a perfect negative correlation, and 0 implies no correlation between the two variables. A positive correlation value establishes that as one variable increases, the other increases, and...
Correlation01:09

Correlation

In statistics, two variables are said to be correlated if the values of one variable are associated with the other variable. Depending on the relationship between two variables, correlation can be of three types– positive correlation, negative correlation, and zero correlation.
Two variables, for example, a and b, are said to be positively correlated if both variables move in the same direction. In other words, a positive correlation exists between two variables, a and b, if:

You might also read

Related Articles

Articles linked to this work by shared authors, journal, and citation graph.

Sort by
Same author

Kernel maximum autocorrelation factor and minimum noise fraction transformations.

IEEE transactions on image processing : a publication of the IEEE Signal Processing Society·2010
Same author

The regularized iteratively reweighted MAD method for change detection in multi- and hyperspectral data.

IEEE transactions on image processing : a publication of the IEEE Signal Processing Society·2007
See all related articles
JoVE
x logofacebook logolinkedin logoyoutube logo
ABOUT JoVE
OverviewLeadershipBlogJoVE Help Center
AUTHORS
Publishing ProcessEditorial BoardScope & PoliciesPeer ReviewFAQSubmit
LIBRARIANS
TestimonialsSubscriptionsAccessResourcesLibrary Advisory BoardFAQ
RESEARCH
JoVE JournalMethods CollectionsJoVE Encyclopedia of ExperimentsArchive
EDUCATION
JoVE CoreJoVE BusinessJoVE Science EducationJoVE Lab ManualFaculty Resource CenterFaculty Site
Terms & Conditions of Use
Privacy Policy
Policies

Related Experiment Video

Updated: Jul 7, 2026

Integrating Remote Sensing with Species Distribution Models; Mapping Tamarisk Invasions Using the Software for Assisted Habitat Modeling (SAHM)
12:26

Integrating Remote Sensing with Species Distribution Models; Mapping Tamarisk Invasions Using the Software for Assisted Habitat Modeling (SAHM)

Published on: October 11, 2016

Multiset canonical correlations analysis and multispectral, truly multitemporal remote sensing data.

Allan Aasbjerg Nielsen1

  • 1Informatics and Math., Tech. Univ. Denmark, Lyngby. aa@imm.dtu.dk

IEEE Transactions on Image Processing : a Publication of the IEEE Signal Processing Society
|February 5, 2008
PubMed
Summary

Canonical Correlation Analysis (CCA) methods fuse multisource data. These techniques reveal decreasing similarity in spectral and temporal variables, proving useful for remote sensing and GIS applications.

Related Experiment Videos

Last Updated: Jul 7, 2026

Integrating Remote Sensing with Species Distribution Models; Mapping Tamarisk Invasions Using the Software for Assisted Habitat Modeling (SAHM)
12:26

Integrating Remote Sensing with Species Distribution Models; Mapping Tamarisk Invasions Using the Software for Assisted Habitat Modeling (SAHM)

Published on: October 11, 2016

Area of Science:

  • Multivariate statistics
  • Remote sensing data analysis
  • Geospatial information science

Background:

  • Canonical Correlation Analysis (CCA) is a statistical method for exploring relationships between two sets of variables.
  • Multisource, multiset, and multitemporal data present challenges for traditional exploratory data analysis.
  • Existing methods may lack robustness to variations in data acquisition (e.g., sensor drift).

Purpose of the Study:

  • To describe two- and multiset Canonical Correlation Analysis (CCA) for data fusion and exploratory analysis.
  • To demonstrate the application of CCA for analyzing multivariate, multiset, or multitemporal data, particularly in remote sensing.
  • To investigate the invariance properties of CCA and its relationship to other statistical techniques.

Main Methods:

  • Application of two- and multiset Canonical Correlation Analysis (CCA).
  • Transformation of multivariate multiset data into orthogonal variables (canonical variates, CVs).
  • R-mode analysis (spectral variables over time) and T-mode analysis (temporal variables at fixed wavelengths).

Main Results:

  • Canonical variates (CVs) exhibit decreasing similarity over successive sets of variables.
  • R-mode and T-mode CVs show maximum similarity for low-order variates and minimum for high-order.
  • Multiset CCA results differed between R- and T-mode analyses, attributed to data noise structures.

Conclusions:

  • CCA techniques are effective for data fusion and exploratory analysis of complex datasets.
  • The invariance properties of CVs enhance robustness in remote sensing applications.
  • Multiset CCA offers a valuable extension to existing methods like PLS and EOF, and is suitable for GIS integration.