Polytopes
Nondegenerate
- {3,4,18}*864
- {3,6,18}*864
- {4,6,18}*864c
- {6,18}*864
- {6,36}*864
- {18,4,3}*864
- {18,6}*864
- {18,6,3}*864
- {18,6,4}*864c
- {36,6}*864
Degenerate
- {2,3,3,2,9}*864
- {2,3,4,2,9}*864
- {2,4,3,2,9}*864
- {2,6,9}*864
- {2,6,36}*864c
- {2,9,2,3,3}*864
- {2,9,2,3,4}*864
- {2,9,2,4,3}*864
- {2,9,6}*864
- {2,36,6}*864c
- {3,3,2,2,9}*864
- {3,3,2,9,2}*864
- {3,3,2,18}*864
- {3,4,2,2,9}*864
- {3,4,2,9}*864
- {3,4,2,9,2}*864
- {3,4,2,18}*864
- {3,6,2,9}*864
- {4,3,2,2,9}*864
- {4,3,2,9}*864
- {4,3,2,9,2}*864
- {4,3,2,18}*864
- {4,6,2,9}*864b
- {4,6,2,9}*864c
- {6,3,2,9}*864
- {6,4,2,9}*864b
- {6,4,2,9}*864c
- {6,9,2}*864
- {6,36,2}*864c
- {9,2,2,3,3}*864
- {9,2,2,3,4}*864
- {9,2,2,4,3}*864
- {9,2,3,3,2}*864
- {9,2,3,4}*864
- {9,2,3,4,2}*864
- {9,2,3,6}*864
- {9,2,4,3}*864
- {9,2,4,3,2}*864
- {9,2,4,6}*864b
- {9,2,4,6}*864c
- {9,2,6,3}*864
- {9,2,6,4}*864b
- {9,2,6,4}*864c
- {9,6,2}*864
- {18,2,3,3}*864
- {18,2,3,4}*864
- {18,2,4,3}*864
- {36,6,2}*864c
Other Groups of Order 864
- SmallGroup(864,7) — 1 nondegenerate, 0 degenerate
- SmallGroup(864,98) — 2 nondegenerate, 0 degenerate
- SmallGroup(864,120) — 0 nondegenerate, 2 degenerate
- SmallGroup(864,126) — 2 nondegenerate, 2 degenerate
- SmallGroup(864,613) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,619) — 2 nondegenerate, 0 degenerate
- SmallGroup(864,633) — 0 nondegenerate, 3 degenerate
- SmallGroup(864,635) — 0 nondegenerate, 12 degenerate
- SmallGroup(864,770) — 4 nondegenerate, 2 degenerate
- SmallGroup(864,781) — 2 nondegenerate, 2 degenerate
- SmallGroup(864,814) — 6 nondegenerate, 0 degenerate
- SmallGroup(864,1018) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,1130) — 3 nondegenerate, 0 degenerate
- SmallGroup(864,1141) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,1157) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,1916) — 2 nondegenerate, 18 degenerate
- SmallGroup(864,1917) — 1 nondegenerate, 0 degenerate
- SmallGroup(864,1920) — 0 nondegenerate, 9 degenerate
- SmallGroup(864,2202) — 2 nondegenerate, 0 degenerate
- SmallGroup(864,2215) — 2 nondegenerate, 0 degenerate
- SmallGroup(864,2225) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,2265) — 6 nondegenerate, 0 degenerate
- SmallGroup(864,2282) — 14 nondegenerate, 0 degenerate
- SmallGroup(864,2437) — 0 nondegenerate, 16 degenerate
- SmallGroup(864,2438) — 0 nondegenerate, 12 degenerate
- SmallGroup(864,2455) — 2 nondegenerate, 12 degenerate
- SmallGroup(864,2462) — 8 nondegenerate, 18 degenerate
- SmallGroup(864,2470) — 7 nondegenerate, 8 degenerate
- SmallGroup(864,2501) — 2 nondegenerate, 8 degenerate
- SmallGroup(864,2511) — 2 nondegenerate, 8 degenerate
- SmallGroup(864,2800) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,2919) — 1 nondegenerate, 0 degenerate
- SmallGroup(864,3998) — 10 nondegenerate, 48 degenerate (this group)
- SmallGroup(864,3999) — 14 nondegenerate, 40 degenerate
- SmallGroup(864,4000) — 26 nondegenerate, 24 degenerate
- SmallGroup(864,4007) — 0 nondegenerate, 40 degenerate
- SmallGroup(864,4032) — 0 nondegenerate, 70 degenerate
- SmallGroup(864,4033) — 0 nondegenerate, 33 degenerate
- SmallGroup(864,4080) — 8 nondegenerate, 0 degenerate
- SmallGroup(864,4094) — 6 nondegenerate, 0 degenerate
- SmallGroup(864,4303) — 2 nondegenerate, 0 degenerate
- SmallGroup(864,4321) — 4 nondegenerate, 0 degenerate
- SmallGroup(864,4368) — 10 nondegenerate, 15 degenerate
- SmallGroup(864,4391) — 2 nondegenerate, 8 degenerate
- SmallGroup(864,4406) — 12 nondegenerate, 8 degenerate
- SmallGroup(864,4407) — 2 nondegenerate, 0 degenerate
- SmallGroup(864,4669) — 5 nondegenerate, 0 degenerate
- SmallGroup(864,4673) — 25 nondegenerate, 37 degenerate
- SmallGroup(864,4686) — 8 nondegenerate, 50 degenerate
- SmallGroup(864,4701) — 0 nondegenerate, 10 degenerate
- SmallGroup(864,4704) — 0 nondegenerate, 109 degenerate