Mathematical Psychology

Separable representations and group decision making in the AHP

International conference

A statistical theory of nonparametric estimation in economic experiments

International conference

The Analytic Hierarchy Process and the Theory of Measurement

Seminar

A Re-Examination of the Algebraic Properties of the AHP as a Ratio-Scaling Technique

The Analytic Hierarchy Process (AHP) ratio-scaling approach is re-examined in view of the recent developments in mathematical psychology based on the so-called separable representations. The study highlights the distortions in the estimates based on the maximum eigenvalue method used in the AHP distinguishing the contributions due to random noises from the effects due to the nonlinearity of the subjective weighting function of separable representations. The analysis is based on the second order expansion of the Perron eigenvector and Perron eigenvalue in reciprocally symmetric matrices with perturbations. The asymptotic distributions of the Perron eigenvector and Perron eigenvalue are derived and related to the eigenvalue-based index of cardinal consistency used in the AHP. The results show the limits of using the latter index as a rule to assess the quality of the estimates of a ratio scale. The AHP method to estimate the ratio scales is compared with the classical ratio magnitude approach used in psychophysics.

A statistical theory of nonparametric estimation in economic and psychophysical experiments

International conference

A statistical theory of nonparametric estimation in economic experiments

International conference

A statistical theory of nonparametric estimation in economic experiments

International conference

A statistical theory of nonparametric estimation in economic experiments

International conference

The Analytic Hierarchy Process and the Theory of Measurement

Seminar

The Analytic Hierarchy Process and the Theory of Measurement

Seminar