In mathematics, George Glauberman's ZJ theorem states that if a finite group G is p-constrained and p-stable and has a normal p-subgroup for some odd prime p, then O<sub>'</sub>(G)Z(J(S)) is a normal subgroup of G, for any Sylow p-subgroup S.
Notation and definitions
- J(S) is the Thompson subgroup of a p-group S: the subgroup generated by the abelian subgroups of maximal order.
- Z(H) means the center of a group H.
- O<sub>'</sub> is the maximal normal subgroup of G of order coprime to p, the '-core
- O<sub>p</sub> is the maximal normal p-subgroup of G, the p-core.
- O<sub>',p</sub>(G) is the maximal normal p-nilpotent subgroup of G, the ',p-core, part of the upper p-series.
- For an odd prime p, a group G with O<sub>p</sub>(G) â 1 is said to be p-stable if whenever P is a of G such that PO<sub></sub>(G) is normal in G, and [P,x,x] = 1, then the image of x in N<sub>G</sub>(P)/C<sub>G</sub>(P) is contained in a normal of N<sub>G</sub>(P)/C<sub>G</sub>(P).
- For an odd prime p, a group G with O<sub>p</sub>(G) â 1 is said to be p-constrained if the centralizer C<sub>G</sub>(P) is contained in O<sub>',p</sub>(G) whenever P is a Sylow of O<sub>',p</sub>(G).
References