Non-conventional preference relations in decision making

書誌事項

Non-conventional preference relations in decision making

J. Kacprzyk, M. Roubens, (eds.)

(Lecture notes in economics and mathematical systems, 301)

Springer-Verlag, c1988

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内容説明・目次

内容説明

Bernard ROY Professor, University of Paris-Dauphine Director of LAMSADE 11 is not unusual for a dozen or so loosely related working papers to be published in book form as the natural outgrowth of a scientific gathering. Although many a volu- me of collected papers has come into point in this way, the homogeneity of the arti- cles included will often be more apparent than real. As the reader will quickly ob- serve, such is not the case with the present volume. As one can judge from its ti- tle, 1t is in fact an outcome of an ed~torial project by J. Kacprzyk and M. Roubens. T~ey asked contributing authors to submit recent works which would examine. within a non-traditional theoretical framework, preference analysis and preference modeliing 1n a fuzzy context oriented towards decision aid. The articles by J.P. Ooignon, B. Monjardet, T. Tanino and Ph. Vincke empnasize the analysis of oreference structures, mainly in the presence of incomparability. In- transitivlty, thresholds and, more generally, inaccurate determination. Considera- ble attention is devoted to the analysis of efficient and non-dominated (in Pareto's sense of the term) decisions in the four papers presented by S. Ovchinnikov and M.

目次

Normative theories of decision making under risk and under uncertainty.- Partial structures of preference.- A generalisation of probabilistic consistency: linearity conditions for valued preference relations.- Fuzzy preference relations in group decision making.- {P,Q,I} - preference structures.- Identifying noninferior decision alternatives based on fuzzy binary relations.- Effective convolutions of vector preference relations in decision making problems.- Choice functions associated with fuzzy preference relations.- Fuzzy possibility graphs and their application to ranking fuzzy numbers.- On measuring consensus in the setting of fuzzy preference relations.- Assumptions of individual preferences in the theory of voting procedures.

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