Distribution Aggregation via Continuous Thiele's Rules
Abstract
We introduce the class of \textit{Continuous Thiele's Rules} that generalize the familiar \textbf{Thiele's rules} \cite{janson2018phragmens} of multi-winner voting to distribution aggregation problems. Each rule in that class maximizes where is an agent 's satisfaction and could be any twice differentiable, increasing and concave real function. Based on a single quantity we call the \textit{'Inequality Aversion'} of (elsewhere known as "Relative Risk Aversion"), we derive bounds on the Egalitarian loss, welfare loss and the approximation of \textit{Average Fair Share}, leading to a quantifiable, continuous presentation of their inevitable trade-offs. In particular, we show that the Nash Product Rule satisfies\textit{ Average Fair Share} in our setting.
Keywords
Cite
@article{arxiv.2408.01054,
title = {Distribution Aggregation via Continuous Thiele's Rules},
author = {Jonathan Wagner and Reshef Meir},
journal= {arXiv preprint arXiv:2408.01054},
year = {2024}
}