Generalizing the concept of binary choice systems induced by rankings: One way of probabilizing deterministic measurement structures

DOI10.1016/0165-4896(92)90036-5zbMath0746.92029OpenAlexW1964261293MaRDI QIDQ1184360

Publication date: 28 June 1992

Published in: Mathematical Social Sciences (Search for Journal in Brave)

Full work available at URL: https://doi.org/10.1016/0165-4896(92)90036-5

zbMATH Keywords

inequalities random utility models axiomatic measurement theory additive conjoint measurement binary choice systems finite systems of linear equations probabilistic measurement probabilistic mixtures of families of relational structures

Mathematics Subject Classification ID

Utility theory (91B16) Measurement theory in the social and behavioral sciences (91C05) Social and behavioral sciences: general topics (91C99)

Related Items (11)

The random utility model with an infinite choice space ⋮ Probabilistic biclassification and random variable representations ⋮ Several unresolved conceptual problems of mathematical psychology ⋮ Individual differences in the algebraic structure of preferences ⋮ A selective review of recent characterizations of stochastic choice models using distribution and functional equation techniques ⋮ An ordinal evaluation of categorical judgement data by random utilities and a corresponding correlation analysis ⋮ Probabilistic preferences and topset voting ⋮ Analysis of multinomial models under inequality constraints: applications to measurement theory ⋮ Random relations, random utilities, and random functions ⋮ Random utility models and their applications: Recent developments ⋮ A general concept of majority rule

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