strans: Stochastic Transitivity

A table displaying the number of violations of the weak, moderate, and strong stochastic transitivity, the number of tests, the error ratio (violations/tests), and the mean and maximum deviation from the minimum probability for which the corresponding transitivity would hold.

Weak (WST), moderate (MST), and strong (SST) stochastic transitivity hold for a set of choice probabilities \(P\), whenever if \(P_{ij} \ge 0.5\) and \(P_{jk} \ge 0.5\), then

\(P_{ik} \ge 0.5\) (WST),

\(P_{ik} \ge \min(P_{ij}, P_{jk})\) (MST),

\(P_{ik} \ge \max(P_{ij}, P_{jk})\) (SST).

See Suppes, Krantz, Luce, and Tversky (1989/2007, chap. 17) for an introduction to the representation of choice probabilities.

If WST holds, a permutation of the indices of the matrix exists such that the proportions in the upper triangular matrix are \(\ge 0.5\). This rearranged matrix is stored in pcm. If WST does not hold, cells in the upper triangular matrix that are smaller than 0.5 are replaced by 0.5. The deviance resulting from this restriction is reported in wst.fit.

The approximate likelihood ratio test for significance of the WST violations is according to Tversky (1969); for a more exact test of WST see Iverson and Falmagne (1985).