Abstract
In the setting of finite groups, suppose
$J$
acts on
$N$
via automorphisms so that the induced semidirect product
$N\rtimes J$
acts on some non-empty set
$\Omega$
, with
$N$
acting transitively. Glauberman proved that if the orders of
$J$
and
$N$
are coprime, then
$J$
fixes a point in
$\Omega$
. We consider the non-coprime case and show that if
$N$
is abelian and a Sylow
$p$
-subgroup of
$J$
fixes a point in
$\Omega$
for each prime
$p$
, then
$J$
fixes a point in
$\Omega$
. We also show that if
$N$
is nilpotent,
$N\rtimes J$
is supersoluble, and a Sylow
$p$
-subgroup of
$J$
fixes a point in
$\Omega$
for each prime
$p$
, then
$J$
fixes a point in
$\Omega$
.
Publisher
Cambridge University Press (CUP)