Nilpotent modules over polynomial rings

Abstract

Let K be an algebraically closed field of characteristic zero, K[X] the polynomial ring in n variables. The vector space Tn = K[X] is a K[X]-module with the action xi · v = vxi' for v ∈ Tn. Every finite dimensional submodule V of Tn is nilpotent, i.e. every polynomial f ∈ K[X] with zero constant term acts nilpotently (by multiplication) on V. We prove that every nilpotent K[X]-module V of finite dimension over K with one dimensional socle can be isomorphically embedded in the module Tn. The automorphism groups of the module Tn and its finite dimensional monomial submodules are found. Similar results are obtained for (non-nilpotent) finite dimensional K[X]-modules with one dimensional socle.