hamiltonian group

In group theory, a non-abelian group G is called Hamiltonian if every subgroup of G is normal. Clearly, every abelian group has this property, because all subgroups of an abelian group are normal subgroups, but there are non-abelian examples as well. The most familiar (and smallest) is the quaternion group of order 8, denoted by Q₈. It can be shown that every Hamiltonian group is a direct sum of the form G = Q₈ + B + D, where B is the direct sum of some number of copies of the cyclic group C₂, and D is a periodic abelian group with all elements of odd order.

<< Previous

Word Browser

Next >>

a hundred yards over the rim
static (the twilight zone)
henry cabot lodge
johnny tapia
henry cabot lodge, jr.
houses of parliament
nothing records
royal assent
ambassadors from the united states
mcclintic sphere
ornette coleman

bretby hall
bretby
joyce grenfell
harry worth
arthur m. brazier
julia sawalha
hugh gaitskell
radio navigation
blithfield hall
conjugate closure
luis muoz marn

jim davidson
choricius of gaza
jane horrocks
procopius of gaza
hesychius of miletus
quaoar (deity)
english bluebell
bluebell
a30 road
tim smit
stephen emanual poulos

quaternion group
chocobo racing
carl loewe
list of ethnic groups in vietnam
o du
si la
list of ethnic groups in laos
wes craven
regulation
the vampire lestat
pan wiccan