Rank-dependent expected utility

As the name implies, the rank-dependent model is applied to the increasing rearrangement ${\displaystyle \mathbf {y} _{[\;]}}$  of ${\displaystyle \mathbf {y} }$  which satisfies ${\displaystyle y_{[1]}\leq y_{[2]}\leq ...\leq y_{[S]}}$ .

${\displaystyle W(\mathbf {y} )=\sum _{s\in \Omega }h_{[s]}(\mathbf {\pi } )u(y_{[s]})}$  where ${\displaystyle \mathbf {\pi } \in \Pi ,u:\mathbb {R} \rightarrow \mathbb {R} ,}$  and ${\displaystyle h_{[s]}(\mathbf {\pi } )}$  is a probability weight such that ${\displaystyle h_{[s]}(\mathbf {\pi } )=q\left(\sum \limits _{t=1}^{s}\pi _{[t]}\right)-q\left(\sum \limits _{t=1}^{s-1}\pi _{[t]}\right)}$  and ${\displaystyle h_{[S]}(\mathbf {\pi } )=q\left(\pi _{[S]}\right)}$ 

for a transformation function ${\displaystyle q:[0,1]\rightarrow [0,1]}$  with ${\displaystyle q(0)=0}$ , ${\displaystyle q(1)=1}$ .

Note that ${\displaystyle \sum _{s\in \Omega }h_{[s]}(\mathbf {\pi } )=q\left(\sum \limits _{t=1}^{S}\pi _{[t]}\right)=q(1)=1}$  so that the decision weights sum to 1.

• Kahneman, Daniel and Amos Tversky. Prospect Theory: An Analysis of Decision under Risk, Econometrica, XVLII (1979), 263-291.
• Tversky, Amos and Daniel Kahneman. Advances in prospect theory: Cumulative representation of uncertainty. Journal of Risk and Uncertainty, 5:297–323, 1992.
• Quiggin, J. (1982), ‘A theory of anticipated utility’, Journal of Economic Behavior and Organization 3(4), 323–43.
• Quiggin, J. Generalized Expected Utility Theory. The Rank-Dependent Model. Boston: Kluwer Academic Publishers, 1993.

• Favourite-longshot bias