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Representation of strongly independent preorders by vector-valued functions
Mpra (2017)
Abstract
We show that without assuming completeness or continuity, a strongly independent preorder on a possibly infinite dimensional convex set can always be given a vector-valued representation that naturally generalizes the standard expected utility representation. More precisely, it can be represented by a mixture-preserving function to a product of lexicographic function spaces.Author Profiles
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References found in this work
Lexicographic expected utility without completeness.D. Borie - 2016 - Theory and Decision 81 (2):167-176.
Theory of games and economic behaviour.John von Neumann & Oskar Morgenstern - 1953 - Princeton University Press.
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