Abstract
As artificial data sets for correspondence analysis, a torus data and a solid torus data are presented. The former has two circular traits and the latter two circular traits and one linear trait representing the radius. The eigenvalue problem for each data is shown to be solvable analytically by dealing with the two parameters each describing the circular trait as free parameters. The solution shows a competition of eigenvalues of the traits involved, so-called Guttman effect.
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