In the metric distortion problem there is a set of candidates and a set of voters, all residing in the same metric space. The objective is to choose a candidate with minimum social cost, defined as the total distance of the chosen candidate from all voters. The challenge is that the algorithm receives only ordinal input from each voter, in the form of a ranked list of candidates in non-decreasing order of their distances from her, whereas the objective function is cardinal. The distortion of an algorithm is its worst-case approximation factor with respect to the optimal social cost. A series of papers culminated in a 3-distortion algorithm, which is tight with respect to all deterministic algorithms. Aiming to overcome the limitations of worst-case analysis, we revisit the metric distortion problem through the learning-augmented framework, where the algorithm is provided with some prediction regarding the optimal candidate. The quality of this prediction is unknown, and the goal is to evaluate the performance of the algorithm under a accurate prediction (known as consistency), while simultaneously providing worst-case guarantees even for arbitrarily inaccurate predictions (known as robustness). For our main result, we characterize the robustness-consistency Pareto frontier for the metric distortion problem. We first identify an inevitable trade-off between robustness and consistency. We then devise a family of learning-augmented algorithms that achieves any desired robustness-consistency pair on this Pareto frontier. Furthermore, we provide a more refined analysis of the distortion bounds as a function of the prediction error (with consistency and robustness being two extremes). Finally, we also prove distortion bounds that integrate the notion of $\alpha$-decisiveness, which quantifies the extent to which a voter prefers her favorite candidate relative to the rest.
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