,"GAP ID"
16Gamma2c,
"Binary octahedral group","48; 28"
"Burnside group:B(4,3)",
"Central product of D8 and Q8","32; 50"
"Central product of D8 and Z4","16; 13"
"Central product of UT(3,3) and Z9","81; 14"
"Central product of UT(3,Z) and Z identifying center with 2Z",
"Cyclic group of prime-square order",
"Cyclic group:Z12","12; 2"
"Cyclic group:Z18","18; 2"
"Cyclic group:Z20","20; 2"
"Cyclic group:Z4","4; 1"
"Cyclic group:Z9","9; 1"
"Dicyclic group:Dic20","20; 1"
"Dihedral group:D8","8; 3"
"Direct product of D8 and D8","64; 226"
"Direct product of D8 and V4","32; 46"
"Direct product of D8 and Z2","16; 11"
"Direct product of D8 and Z3","24; 10"
"Direct product of D8 and Z4","32; 25"
"Direct product of D8 and Z4 and Z2","64; 196"
"Direct product of Dic12 and Z2","24; 7"
"Direct product of E16 and Z4","64; 260"
"Direct product of E8 and Z4","32; 45"
"Direct product of Q8 and V4","32; 47"
"Direct product of Q8 and Z2","16; 12"
"Direct product of Q8 and Z3","24; 11"
"Direct product of Q8 and Z4","32; 26"
"Direct product of S3 and Z4","24; 5"
"Direct product of SmallGroup(16,13) and Z2","32; 48"
"Direct product of SmallGroup(16,3) and Z2","32; 22"
"Direct product of SmallGroup(16,4) and Z2","32; 23"
"Direct product of Z4 and V4","16; 10"
"Direct product of Z4 and Z2","8; 2"
"Direct product of Z4 and Z4","16; 2"
"Direct product of Z4 and Z4 and V4","64; 192"
"Direct product of Z4 and Z4 and Z2","32; 21"
"Direct product of Z4 and Z4 and Z4","64; 55"
"Direct product of Z9 and E9","81; 11"
"Direct product of Z9 and Z3","27; 2"
"Direct product of Z9 and Z9","81; 2"
"Direct product of Z9 and Z9 and Z3","243; 31"
"Direct product of cyclic group of prime-square order and cyclic group of prime order",
"Direct product of cyclic group of prime-square order and cyclic group of prime-square order",
"Direct product of cyclic group of prime-square order and elementary abelian group of prime-square order",
"Faithful semidirect product of E8 and Z4","32; 6"
"General linear group:GL(2,3)","48; 29"
"Generalized dihedral group for direct product of Z4 and Z4","32; 34"
"Holomorph of Z9","54; 6"
"Inner automorphism group of wreath product of Z5 and Z5","3125; 30"