A Note on the Height of Transitive Depth-One Graded Lie Algebras Generated by Their Local Parts ()
Let the characteristic 
of the base field be greater than two. In [1] , V.G. Kac defined the local part of a graded Lie algebra 
to be 
which we will assume to be finite dimen- sional. We will refer to 
as the height of
.
Lemma 1. If 
is a transitive graded Lie algebra which is generated by its finite- dimensional local part, then the height 
of 
is less than or equal to
, where 
Proof. If 
are any elements of 
(or 
or
, respectively) and 
is an element of 
then we have by the Leibniz rule that
![]()
Now, ![]()
is an element of![]()
, (or ![]()
or![]()
, respectively) which is zero, since ![]()
is assumed to be greater than two, and the depth of ![]()
is one. Because of the commutativity of![]()
, we have that![]()
. Consequently, by the transitivity of![]()
, we have ![]()
for ![]()
greater than or equal to![]()
. ![]()
Note that the height of the Jacobson-Witt algebra ![]()
is![]()
.
Because the gradation spaces of positive degree of transitive graded Lie algebras are contained in Cartan prolongations, those gradation spaces will be finite dimensional whenever the local part of the transitive Lie algebra is finite dimensional. Thus, when the gradation degrees of a transitive graded Lie algebra with a finite- dimensional local part are bounded, the Lie algebra is itself finite dimensional.