H
Henri Prade
Researcher at Paul Sabatier University
Publications - 935
Citations - 57015
Henri Prade is an academic researcher from Paul Sabatier University. The author has contributed to research in topics: Possibility theory & Fuzzy set. The author has an hindex of 108, co-authored 917 publications receiving 54583 citations. Previous affiliations of Henri Prade include Centre national de la recherche scientifique & University of Toulouse.
Papers
More filters
Book
Fuzzy Sets and Systems: Theory and Applications
Didier Dubois,Henri Prade +1 more
TL;DR: This book effectively constitutes a detailed annotated bibliography in quasitextbook style of the some thousand contributions deemed by Messrs. Dubois and Prade to belong to the area of fuzzy set theory and its applications or interactions in a wide spectrum of scientific disciplines.
Journal ArticleDOI
Rough fuzzy sets and fuzzy rough sets
Didier Dubois,Henri Prade +1 more
TL;DR: It is argued that both notions of a rough set and a fuzzy set aim to different purposes, and it is more natural to try to combine the two models of uncertainty (vagueness and coarseness) rather than to have them compete on the same problems.
Book
Possibility Theory: An Approach to Computerized Processing of Uncertainty
Didier Dubois,Henri Prade +1 more
TL;DR: This chapter discusses the use of Fuzzy Sets for the Evaluation and Ranking of Objects, a Quantitative Approach to Multiaspect Choice, and some of the techniques used in this approach.
Journal ArticleDOI
Operations on fuzzy numbers
Didier Dubois,Henri Prade +1 more
TL;DR: The usual algebraic operations on real numbers are extended to fuzzy numbers by the use of a fuzzification principle, and the practical use of fuzzified operations is shown to be easy, requiring no more computation than when dealing with error intervals in classic tolerance analysis.
Journal ArticleDOI
Ranking fuzzy numbers in the setting of possibility theory
Didier Dubois,Henri Prade +1 more
TL;DR: A complete set of comparison indices is proposed in the framework of Zadeh's possibility theory and it is shown that generally four indices enable one to completely describe the respective locations of two fuzzy numbers.