- Zassenhaus group
In
mathematics , a Zassenhaus group, named afterHans Julius Zassenhaus , is a certain sort of doubly transitivepermutation group very closely related to rank-1groups of Lie type .Definition
A Zassenhaus group is a permutation group "G" on a finite set "X" with the following three properties:
* "G" is doubly transitive.
*Non-trivial elements of "G" fix at most two points.
*"G" has no regular
normal subgroup . ("Regular" means that non-trivial elements do not fix any points of "X".)The degree of a Zassenhaus group is the number of elements of "X".
Some authors omit the third condition that "G" has no regular normal subgroup. This condition is put in to eliminate some "degenerate" cases. The extra examples one gets by omitting it are either
Frobenius group s or certain groups of degree 2"p" and order2"p"(2"p" − 1)"p" for a prime "p", that are generated by all semilinearmappings and Galois automorphisms of a field of order 2"p".Examples
We let "q" = "pf" be a power of a prime "p", and write "Fq" for the
finite field of order "q". Suzuki proved that any Zassenhaus group is of one of the following four types:* The projective special linear group "PSL"2("F""q") for "q" > 3 odd, acting on the "q" + 1 points of the projective line. It has order ("q" + 1)"q"("q" − 1)/2.
*The projective general linear group "PGL"2("F""q") for "q" > 3. It has order ("q" + 1)"q"("q" − 1).
*A certain group containing "PSL"2("F""q") with index 2, for "q" an odd square. It has order ("q" + 1)"q"("q" − 1).
*The
Suzuki group "Suz"("F""q") for "q" a power of 2 that is at least 8 and not a square. The order is ("q"2 + 1)"q"2("q" − 1)The degree of these groups is "q" + 1 in the first three cases, "q"2 + 1 in the last case.
Further reading
*"Finite Groups III" (Grundlehren Der Mathematischen Wissenschaften Series, Vol 243) by B. Huppert, N. Blackburn, ISBN 0-387-10633-2
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