Rotation in correspondence analysis from the canonical correlation perspective
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Publication:2088927
DOI10.1007/S11336-021-09833-7zbMath1496.62209OpenAlexW4206566591MaRDI QIDQ2088927
Publication date: 6 October 2022
Published in: Psychometrika (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/s11336-021-09833-7
Factor analysis and principal components; correspondence analysis (62H25) Measures of association (correlation, canonical correlation, etc.) (62H20) Applications of statistics to psychology (62P15)
Uses Software
Cites Work
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- Rotation in correspondence analysis
- A simple general method for oblique rotation
- Interpretation of canonical analysis: Rotated vs. unrotated solutions
- On an eigenvalue property relevant in correspondence analysis and related methods
- Simplimax: Oblique rotation to an optimal target with simple structure
- A factor simplicity index
- Oblique rotaton in canonical correlation analysis reformulated as maximizing the generalized coefficient of determination
- An analytical solution for approximating simple structure in factor analysis
- Correspondence Analysis
- Tying up the loose ends in simple, multiple, joint correspondence analysis
- Non-linear canonical correlation†
- Oblique Promax Rotation Applied to the Solutions in Multiple Correspondence Analysis
- Canonical Correlation Analysis Formulated as Maximizing Sum of Squared Correlations and Rotation of Structure Matrices
- RELATIONS BETWEEN TWO SETS OF VARIATES
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