Add to ORKGWe consider the problem of ranking sets of objects, the members of which are mutually compatible. Assuming that each object is either good or bad, we axiomatically characterize a cardinality−based rule which arises naturally in this dichotomous setting. Thanks are due to Ritxar Arlegi and Shao Chin Sung for very helpful comments and useful suggestions. Dinko Dimitro
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
We consider the problem of ranking sets of objects, the members of which are mutually compatible.Ass...
We consider the problem of ranking sets of objects, the members of which are mutually compatible. As...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper provides an axiomatic characterization of two rules for comparing alternative sets of obj...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X in...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
We consider the problem of ranking sets of objects, the members of which are mutually compatible.Ass...
We consider the problem of ranking sets of objects, the members of which are mutually compatible. As...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X int...
This paper provides an axiomatic characterization of two rules for comparing alternative sets of obj...
This paper is devoted to the study of how to extend a dichotomous partition of a universal set X in...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...
This paper analyzes some ranking methods in two-sided settings through their axiomatization. In thes...