The variety of nilpotent elements and invariant polynomial functions on the special algebra Sn.

In the study of the variety of nilpotent elements in a Lie algebra, Premet conjectured that this variety is irreducible for any finite dimensional restricted Lie algebra. In this paper, with the assumption that the ground field is algebraically closed of characteristic p > 3, we confirm this conjecture for the Lie algebras of Cartan type S˜ _n and S_n. Moreover, we show that the variety of nilpotent elements in S_n is a complete intersection. Motivated by the proof of the irreducibility, we describe explicitly the ring of invariant polynomial functions on S_n. [ABSTRACT FROM AUTHOR]