Bob Oliver conjectures that if $p$ is an odd prime and $S$ is a finite
$p$-group, then the Oliver subgroup $\X(S)$ contains the Thompson subgroup
$J_e(S)$. A positive resolution of this conjecture would give the existence and
uniqueness of centric linking systems for fusion systems at odd primes. Using
ideas and work of Glauberman, we prove that if $p \geq 5$, $G$ is a finite
$p$-group, and $V$ is an elementary abelian $p$-group which is an F-module for
$G$, then there exists a quadratic offender which is 2-subnormal (normal in its
normal closure) in $G$.