an:04053864
Zbl 0646.17008
Mikhalev, A. A.
Subalgebras of free Lie p-superalgebras
RU
Mat. Zametki 43, No. 2, 178-191 (1988).
00168098
1988
j
17B70 17B05 17A70
Lie superalgebra; restricted Lie algebra; linear basis; free Lie p- superalgebra; homogeneous subalgebra; free generators; positive characteristic
A Lie superalgebra \(L=L_ 0+L_ 1\) over a field F of positive characteristic p is called a p-superalgebra if \(L_ 0\) is a restricted Lie algebra \((=p\)-algebra) and
\[
[y,x^ p]=[[...[y,x],...(p- times)...],x]
\]
where \(y\in L\), \(x\in L_ 0\). Such superalgebras naturally arise in studying Lie superalgebras over fields of positive characteristic. The author finds a natural linear basis in a free Lie p- superalgebra, proves that any homogeneous subalgebra in such a superalgebra is itself free and shows that a homogeneous subalgebra of finite codimension in a finitely generated Lie superalgebra is finitely generated, with precise formula for the number of free generators in the free case.
This is applied to proving an analogue of G. P. Kukin's theorem on intersection of finitely generated subalgebras in free Lie algebras for free Lie superalgebras over fields of positive characteristic. The case of zero characteristic remains open.
Yu.A.Bakhturin