Let the rigid points of a matrix group refer to subgroups of it that stabilize a nonzero vector and are maximal among such subgroups.
How many conjugacy classes of rigid points are there under the automorphism group $\mathrm{Co}_0$ of the Leech lattice, and what are they?
I am already aware of the following classes:
- $\mathrm{Co}_2$
- $\mathrm{Co}_3$
- $\mathrm{M}_{24}$
- $2^{11}:\mathrm{M}_{23}$
- $\mathrm{P}\Gamma\mathrm{U}_6(2)$
- $3^6:(2\times\mathrm{M}_{11})$
