Conjugacy functor that controls fusion

This article defines a property that can be evaluated for a conjugacy functor on a finite group. |View all such properties

Definition

Suppose $G$ is a finite group and $p$ is a prime number. Suppose $W$ is a conjugacy functor on the nontrivial $p$ -subgroups of $G$ . We say that $W$ controls $p$ -fusion in $G$ if, for any $p$ -Sylow subgroup $P$ of $G$ , $P$ is a weak subset-conjugacy-determined subgroup inside $N_{G} (W (P))$ .

(Note that $P$ is contained in $N_{G} (W (P))$ because $W (P)$ is normal in $P$ by the conjugation-invariance property that conjugacy functors have to satisfy. In fact, $N_{G} (P) \leq N_{G} (W (P))$ by the fact that conjugacy functor gives normalizer-relatively normal subgroup).

Relation with other properties

Stronger properties

Property	Proof of implication	Intermediate notions
Conjugacy functor that gives a normal subgroup		\|FULL LIST, MORE INFO
Conjugacy functor that controls strong fusion		\|FULL LIST, MORE INFO
Conjugacy functor whose normalizer generates whole group with p'-core	Conjugacy functor whose normalizer generates whole group with p'-core controls fusion	\|FULL LIST, MORE INFO

Related group properties

Group in which the ZJ-functor controls fusion

Facts

Control of fusion is local: If $W$ is a conjugacy functor such that the restriction of $W$ to the normalizer of any non-identity $p$ subgroup controls fusion in that subgroup, then $W$ controls fusion in the whole group.