This is a data supplement to an article with the same name by Michael Joswig, Max Klimm and Sylvain Spitz.
Here we provide the input for computations with TOPCOM or mptopcom; these can be used interchangeably. The output data is stored on Zenodo.
Table 1 in that article lists the numbers of orbits of triangulations of cubes with respect to various group actions. The first two columns recall known facts; see our article for the references. The first row refers to the case m=2, which is trivial to compute.
This data set provides the data for m=3 and m=4 with the groups Sm (stabilizer of the origin) and Gm (full group of affine automorphisms).
With mptopcom suitably installed the command for producing the output of the last two columns/last two roes of Table 1 read:
for dat in cube3_S3 cube3_G3 cube4_S4 cube4_G4 ; do mpirun mptopcom --flip-cache 20000 --orbit-cache 20000 --regular < $dat.dat > $dat.out ; done
The relevant files for Table 2 are (in the order they appear in the table):
cube3.dat, cube3_S2xS2xS2.dat, cube3_S2xS3.dat cube4.dat, cube4_S2xS2xS2xS2.dat, cube4_S2xS4.dat D2xD2.dat, D2xD2_S3xS3.dat, D2xD2_S3xS2.dat D3xD3.dat, D3xD3_S4xS2.dat, D3xD3_S4xS4.dat