Diversity of Structured Domains via k-Kemeny Scores

Authors

  • Piotr Faliszewski AGH University, Poland
  • Krzysztof Sornat AGH University, Poland
  • Stanisław Szufa AGH University, Poland CNRS, LAMSADE, Université Paris Dauphine – PSL, France
  • Tomasz Wąs University of Oxford, United Kingdom

DOI:

https://doi.org/10.1609/aaai.v40i20.38733

Abstract

In the k-Kemeny problem, we are given an ordinal election, i.e., a collection of votes ranking the candidates from best to worst, and we seek the smallest number of swaps of adjacent candidates that ensure that the election has at most k different rankings. We study this problem for a number of structured domains, including the single-peaked, single-crossing, group-separable, and Euclidean ones. We obtain two kinds of results: (1) We show that k-Kemeny remains intractable under most of these domains, even for k=2, and (2) we use k-Kemeny to rank these domains in terms of their diversity.
AAAI-26 / IAAI-26 / EAAI-26 Proceedings Cover

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Published

2026-03-14

How to Cite

Faliszewski, P., Sornat, K., Szufa, S., & Wąs, T. (2026). Diversity of Structured Domains via k-Kemeny Scores. Proceedings of the AAAI Conference on Artificial Intelligence, 40(20), 16880–16888. https://doi.org/10.1609/aaai.v40i20.38733

Issue

Vol. 40 No. 20: AAAI-26 Technical Tracks 20

Section

AAAI Technical Track on Game Theory and Economic Paradigms