Bradley-Terry-Luce models with an ordered response

[1]  W. D. Stirling Fitting linear models to ordinal responses , 1984 .

[2]  J. Anderson,et al.  Regression, Discrimination and Measurement Models for Ordered Categorical Variables , 1981 .

[3]  R. Beaver Weighted Least-Squares Analysis of Several Univariate Bradley-Terry Models , 1977 .

[4]  J. Yellott The relationship between Luce's Choice Axiom, Thurstone's Theory of Comparative Judgment, and the double exponential distribution , 1977 .

[5]  R. Plackett The analysis of categorical data , 1974 .

[6]  R. Davidson On Extending the Bradley-Terry Model to Accommodate Ties in Paired Comparison Experiments , 1970 .

[7]  G. Koch,et al.  Analysis of categorical data by linear models. , 1969, Biometrics.

[8]  F. Samejima Estimation of latent ability using a response pattern of graded scores , 1968 .

[9]  P. V. Rao,et al.  Ties in Paired-Comparison Experiments: A Generalization of the Bradley-Terry Model , 1967 .

[10]  H. A. David,et al.  Ties in Paired-Comparison Experiments Using a Modified Thurstone-Mosteller Model , 1960 .

[11]  H. D. Block,et al.  Random Orderings and Stochastic Theories of Responses (1960) , 1959 .

[12]  R. A. Bradley,et al.  RANK ANALYSIS OF INCOMPLETE BLOCK DESIGNS THE METHOD OF PAIRED COMPARISONS , 1952 .

[13]  R. A. Bradley,et al.  Rank Analysis of Incomplete Block Designs: I. The Method of Paired Comparisons , 1952 .

[14]  L. L. Thurstone,et al.  An internal consistency check for scale values determined by the method of successive intervals , 1952 .

[15]  G. Tutz [Discrete probabalistic reaction models as categorial regression models]. , 1985, Archiv fur Psychologie.

[16]  P. McCullagh Regression Models for Ordinal Data , 1980 .

[17]  Eugene Galanter,et al.  Handbook of mathematical psychology: I. , 1963 .