| Election type | Ordinal |
|---|---|
| Culture | Euclidean 3D-or-more |
| Candidates | {8} |
| Voters | {80} |
| 480 elections of size 8x80 | |
| Instances | 20 |
| Exact quantities of 480 elections (Appendix A.3) Approximately 20 elections per culture model #elections Impartial Culture 20 single-peaked (Conitzer) 20 single-peaked (Walsh) 20 single-peaked on a circle 20 single-crossing 20 1D-Euclidean (uniform interval) 20 2D-Euclidean (uniform interval) 20 3D-Euclidean (uniform interval) 20 5D-Euclidean (uniform interval) 20 10D-Euclidean (uniform interval) 20 20D-Euclidean (uniform interval) 20 2D-Euclidean (sphere) 20 3D-Euclidean (sphere) 20 5D-Euclidean (sphere) 20 group-separable (balanced) 20 group-separable (caterpillar) 20 normalized Mallows model 80 urn model 80 | |
| Parameters | Uniform 3D ($[0,1]^3$); Uniform 5D ($[0,1]^5$); Uniform 10D ($[0,1]^10$); Uniform 20D ($[0,1]^20$); Uniform 2D Sphere ($(0, 0)$ $r=1$); Uniform 3D Sphere ($(0, 0)$ $r=1$); Uniform 5D Sphere ($(0, 0)$ $r=1$) |
| Notes | See Section 4. (An Experiment) for more details of frequency matrix realizability in restricted domain. See Section 5. (Experiment 1.) for more details of condorcet condition efficiency. See Section 5. (Experiment 2.) for more details of possible condorcet winners number. |