Regular derivations of truncated polynomial rings

Abstract

Let be an algebraically closed field of characteristic p>2. Let On=[X1,…,Xn]/(X1p,…, Xnp), a truncated polynomial ring in n variables, and denote by L the derivation algebra of On. It is known that the ring of all polynomial functions on L invariant under the action of the group of Aut(L) is freely generated by n elements. Furthermore, the related quotient morphism is faithfully flat and all its fibres are irreducible complete intersections. An element x∈L is called regular if the centraliser of x in L has the smallest possible dimension. In this preprint we give an explicit description of regular elements of L and show that a precise analogue of Kostant's differential criterion for regularity holds in L. We also show that a fibre of the above mentioned quotient morphism is normal if and only if it consists of regular semisimple elements of L.