- Frattini's argument
In
group theory , a branch ofmathematics , Frattini's argument is an important lemma in the structure theory offinite group s. It is named afterGiovanni Frattini , who first used it in a paper from 1885 when defining theFrattini subgroup of a group.tatement and proof
Frattini's argument states that if a finite group "G" has a normal subgroup "H" and if "H" has a Sylow "p"-subgroup "P" then
:"G" = "N""G"("P")"H",
where "N""G"("P") denotes the normalizer of "P" in "G".
Proof: "P" is a Sylow "p"-subgroup of "H", so its "H"-conjugates "h"−1"Ph" are also Sylow "p"-subgroups belonging to "H". "H" is normal in G, so the action of a "g" ∈ "G" by conjugacy sends "P" in "H" to one of its "H"-conjugates (see
Sylow theorems ), i.e.:"g"−1"Pg" = "h"−1"Ph",
so :"hg"−1"Pgh"−1 = "P", thus
:"gh"−1 ∈ "N""G"("P"),
therefore "g" ∈ "N""G"("P")"H". But "g" ∈ "G" was arbitrary, so "G" = "HN""G"("P") = "N""G"("P")"H".
Applications
* Frattini's argument can be used as part of a proof that any finite
nilpotent group is adirect product of its Sylow subgroups.
* By applying Frattini's argument to "N""G"("N""G"("P")), it can be shown that "N""G"("N""G"("P")) = "N""G"("P") whenever "G" is a finite group and "P" is a Sylow "p"-subgroup of "G".
* More generally, if a subgroup "M" ≤ "G" contains "N""G"("P") for some Sylow "p"-subgroup "P" of "G", then "M" is self-normalizing, "i.e." "M" = "N""G"("M").::Proof: "M" is normal in "H" := "N""G"("M"), and "P" is a Sylow "p"-subgroup of "M", so the Frattini argument applied to the group "H" with normal subgroup "M" and Sylow "p"-subgroup "P" gives "N""H"("P")"M" = "H". Since "N""H"("P") ≤ "N""G"("P") ≤ "M", one has the chain of inclusions "M" ≤ "H" = "N""H"("P")"M" ≤ "M" "M" = "M", so "M" = "H".
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