In this paper we continue our study of the Frattini p-subalgebra of a
Lie p-algebra L. We show first that ii L is solvable then its Frattini
p-subalgebra is an ideal of L. We then consider Lie p-algebras L in w
hich L-2 is nilpotent and find necessary and sufficient conditions for
the Frattini p-subalgebra to be trivial. From this we deduce, in part
icular, that in such an algebra every ideal also has trivial Frattini
p-subalgebra, and ii the underlying field is algebraically closed then
so does every subalgebra. Finally we consider Lie p-algebras L in whi
ch the Frattini p-subalgebra of every subalgebra of L is contained in
the Frattini p-subalgebra of L itself.