TY - UNPB
T1 - On Representation and Weighted Utilitarian Representation of Preference Orders on Finite Utility Streams
AU - Mitra, Tapan
AU - Ozbek, Kemal
PY - 2014
Y1 - 2014
N2 - In this paper we examine the axiomatic basis of a key result on weighted utilitarian representation of preference orders on finite utility streams. We show that a preference order satisfying the axioms of Minimal Individual Symmetry, Invariance and Strong Pareto need not have a representation, and thus in particular a weighted utilitarian representation. The example establishing this result might also be of interest for the literature on the representation of preference orders. We then establish that whenever a preference order satisfying the axioms of Minimal Individual Symmetry, Invariance and Weak Pareto has a representation, it also has a weighted utilitarian representation. Our approach helps us to view the available results on the weighted utilitatarian representation theorem from a different perspective.
AB - In this paper we examine the axiomatic basis of a key result on weighted utilitarian representation of preference orders on finite utility streams. We show that a preference order satisfying the axioms of Minimal Individual Symmetry, Invariance and Strong Pareto need not have a representation, and thus in particular a weighted utilitarian representation. The example establishing this result might also be of interest for the literature on the representation of preference orders. We then establish that whenever a preference order satisfying the axioms of Minimal Individual Symmetry, Invariance and Weak Pareto has a representation, it also has a weighted utilitarian representation. Our approach helps us to view the available results on the weighted utilitatarian representation theorem from a different perspective.
KW - Invariance Axiom
KW - Minimal Individual Symmetry
KW - Pareto Axiom
KW - Decomposition of Irrationals
UR - https://cae.economics.cornell.edu/10.05.pdf
M3 - Working paper
BT - On Representation and Weighted Utilitarian Representation of Preference Orders on Finite Utility Streams
ER -