Distortion of Multi-Winner Elections on the Line Metric: The Polar Comparison Rule

We consider the problem of selecting a committee of $k$ alternatives among $m$ alternatives, based on the ordinal rank list of voters. Our focus is on the case where both voters and alternatives lie on a metric space-specifically, on the line-and the objective is to minimize the additive social cost. The additive social cost is the sum of the costs for all voters, where the cost for each voter is defined as the sum of their distances to each member of the selected committee. We propose a new voting rule, the Polar Comparison Rule, which achieves upper bounds of $1 + \sqrt{2} \approx 2.41$ and $7/3 \approx 2.33$ distortions for $k = 2$ and $k = 3$, respectively, and we show that these bounds are tight. Furthermore, we generalize this rule, showing that it maintains a distortion of roughly $7/3$ based on the remainder of the committee size when divided by three. We also establish lower bounds on the achievable distortion based on the parity of $k$ and for both small and large committee sizes.