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Cn
Dn
Sn
An
Degree
Linear
Irr Reps
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Extensions 1→N→G→Q→1 with N=C2 and Q=C2×C4.Dic3

Direct product G=N×Q with N=C2 and Q=C2×C4.Dic3
dρLabelID
C22×C4.Dic396C2^2xC4.Dic3192,1340


Non-split extensions G=N.Q with N=C2 and Q=C2×C4.Dic3
extensionφ:Q→Aut NdρLabelID
C2.1(C2×C4.Dic3) = C2×C42.S3central extension (φ=1)192C2.1(C2xC4.Dic3)192,480
C2.2(C2×C4.Dic3) = C4×C4.Dic3central extension (φ=1)96C2.2(C2xC4.Dic3)192,481
C2.3(C2×C4.Dic3) = C2×C12⋊C8central extension (φ=1)192C2.3(C2xC4.Dic3)192,482
C2.4(C2×C4.Dic3) = C42.285D6central extension (φ=1)96C2.4(C2xC4.Dic3)192,484
C2.5(C2×C4.Dic3) = C2×C12.55D4central extension (φ=1)96C2.5(C2xC4.Dic3)192,765
C2.6(C2×C4.Dic3) = C127M4(2)central stem extension (φ=1)96C2.6(C2xC4.Dic3)192,483
C2.7(C2×C4.Dic3) = C42.270D6central stem extension (φ=1)96C2.7(C2xC4.Dic3)192,485
C2.8(C2×C4.Dic3) = C42.47D6central stem extension (φ=1)96C2.8(C2xC4.Dic3)192,570
C2.9(C2×C4.Dic3) = C123M4(2)central stem extension (φ=1)96C2.9(C2xC4.Dic3)192,571
C2.10(C2×C4.Dic3) = C42.210D6central stem extension (φ=1)192C2.10(C2xC4.Dic3)192,583
C2.11(C2×C4.Dic3) = C24.6Dic3central stem extension (φ=1)48C2.11(C2xC4.Dic3)192,766

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