| Election type | Ordinal |
|---|---|
| Culture | Euclidean 3D-or-more |
| Candidates | {4} |
| Voters | {16} |
| 480 elections of size 4x16 | |
| 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 | for each election of the dataset we computed its position matrix and all elections realizing this matrix See Appendix B.2 for more details |