Abstract
Given a finite set X and a collection Π of linear orders defined on X, computing a median linear order (Condorcet-Kemeny's problem) consists in determining a linear order minimizing the remoteness from Π. This remoteness is based on the symmetric distance, and measures the number of disagreements between O and Π. In the context of voting theory, X can be considered as a set of candidates and the linear orders of Π as the preferences of voters, while a linear order minimizing the remoteness from Π can be adopted as the collective ranking of the candidates with respect to the voters' opinions. This paper studies the complexity of this problem and of several variants of it: computing a median order, computing a winner according to this method, checking that a given candidate is a winner and so on. We try to locate these problems inside the polynomial hierarchy.
| Original language | English |
|---|---|
| Pages (from-to) | 57-64 |
| Number of pages | 8 |
| Journal | Electronic Notes in Discrete Mathematics |
| Volume | 42 |
| DOIs | |
| Publication status | Published - 11 Jun 2013 |
Keywords
- Complexity
- Condorcet-Kemeny problem
- Feedback arc set
- Linear order
- Linear ordering problem
- Majority tournament
- Median order
- NP-completeness
- NP-hardness
- Pairwise comparison method
- Polynomial hierarchy
- Slater problem
- Turing transformation
- Voting theory