Nontransitive Decomposable Conjoint Measurement 1
نویسنده
چکیده
Traditional models of conjoint measurement look for an additive representation of transitive preferences. They have been generalized in two directions. Nontransitive additive conjoint measurement models allow for nontransitive preferences while retaining the additivity feature of traditional models. Decomposable conjoint measurement models are transitive but replace additivity by a mere decomposability requirement. This paper presents generalizations of conjoint measurement models combining these two aspects. This allows us to propose a simple axiomatic treatment that shows the pure consequences of several cancellation conditions used in traditional models. These nontransitve decomposable conjoint measurement models encompass a large number of aggregation rules that have been introduced in the literature.
منابع مشابه
Following the traces
This paper presents a self-contained introduction to a general conjoint measurement framework for the analysis of nontransitive and/or incomplete binary relations on product sets. It is based on the use of several kinds of marginal traces on coordinates induced by the binary relation. This framework leads to defining three general families of models depending on the kind of trace that they use....
متن کاملAn introduction to conjoint measurement without transitivity and additivity
This paper presents a self-contained introduction to a general conjoint measurement framework for the analysis of nontransitive and/or incomplete binary relations on product sets. It is based on the use of several kinds of marginal traces on coordinates induced by the binary relation. This framework leads to defining three general families of models depending on the kind of trace that they use....
متن کاملFollowing the traces: : An introduction to conjoint measurement without transitivity and additivity
This paper presents a self-contained introduction to a general conjoint measurement framework for the analysis of nontransitive and/or incomplete binary relations on product sets. It is based on the use of several kinds of marginal traces on coordinates induced by the binary relation. This framework leads to defining three general families of models depending on the kind of trace that they use....
متن کاملNontransitive models for decision making under uncertainty: A general framework and some applications Extended abstract
In a series of recent papers (Bouyssou and Pirlot, 2002, 2004a), we have proposed several conjoint measurement models that tolerate intransitive preferences. Their main characteristic is that they replace the additivity requirements used in most models designed to cope with intransitivities (e.g. the additive difference model proposed by Tversky (1969) and analyzed in Fishburn (1992) or the add...
متن کاملCan Adaptive Conjoint Analysis perform in a Preference Logic Framework?
Research on conjoint analysis/preference aggregation/social choice aggregation is performed by more than forty years by various communities. However, many proposed mathematical models understand preferences as irreflexive, transitive and statical relations while there is human psychology research work questioning these properties as being not enough motivated. This works propose to position the...
متن کامل