Walter's theorem states that if
G is a finite group whose 2-Sylow subgroups are abelian, then
G/
O(
G) has a
normal subgroup of odd
index that is a product of groups each of which is a
2-group or one of the
simple groups PSL2(
q) for
q = 2
n or
q = 3 or 5
mod 8, or the
Janko group J1, or
Ree groups 2
G2(32
n+1). (Here
O(
G) denotes the unique largest normal subgroup of
G of odd order.) The original statement of Walter's theorem did not quite identify the Ree groups, but only stated that the corresponding groups have a similar subgroup structure as Ree groups. and later showed that they are all Ree groups, and gave a unified exposition of this result. ==References==