General representation theorems for fuzzy weak orders

U. Bodenhofer, B. De Baets, J. Fodor. General representation theorems for fuzzy weak orders. volume 4342, pages 229-244, 2006.

Autoren
  • Ulrich Bodenhofer
  • Bernard De Baets
  • János Fodor
Editoren
  • H.C.M. de Swart
  • E. Orlowska
  • M. Roubens. G. Schmidt
BuchTheory and Applications of Relationals Strucutes as Knowledge Instruments II
TypIn Sammelband
VerlagSpringer
SerieLecture Notes in Computer Science
Band4342
ISBN3-540-69223-1
Jahr2006
Seiten229-244
Abstract The present paper gives a state-of-the-art overview of general representation results for fuzzy weak orders. We do not assume that the underlying domain of alternatives is finite. Instead, we concentrate on results that hold in the most general case that the underlying domain is possibly infinite. This paper presents three fundamental representation results: (i) score functionbased representations, (ii) inclusion-based representations, (iii) representations by decomposition into crisp linear orders and fuzzy equivalence relations.