Tight Bounds On the Distortion of Randomized and Deterministic Distributed Voting

Abstract

We study metric distortion in distributed voting, where n voters are partitioned into k groups, each selecting a local representative, and a final winner is chosen from these representatives (or from the entire set of candidates). This setting models systems like U.S. presidential elections, where state-level decisions determine the national outcome. We focus on four cost objectives from anshelevich2022distortion: , , , and . We present improved distortion bounds for both deterministic and randomized mechanisms, offering a near-complete characterization of distortion in this model. For deterministic mechanisms, we reduce the upper bound for from 11 to 7, establish a tight lower bound of 5 for (improving on 2+5), and tighten the upper bound for from 5 to 3. For randomized mechanisms, we consider two settings: (i) only the second stage is randomized, and (ii) both stages may be randomized. In case (i), we prove tight bounds: 5\!-\!2/k for , 3 for and , and 5 for . In case (ii), we show tight bounds of 3 for and , and nearly tight bounds for and within [3\!-\!2/n,\ 3\!-\!2/(kn*)] and [3\!-\!2/n,\ 3], respectively, where n* denotes the largest group size.