Symmetric modules over the infinite polynomial ring I: nilpotent quotients

Abstract

Cohen proved that the infinite variable polynomial ring R=k[x1,x2,…] is noetherian with respect to the action of the infinite symmetric group S. The first two authors began a program to understand the S-equivariant algebra of R in detail. In previous work, they classified the S-prime ideals of R. An important example of an S-prime is the ideal hs generated by (s+1)st powers of the variables. In this paper, we study the category of R/hs-modules. We obtain a number of results, and mention just three here: (a) we determine the Grothendieck group of the category; (b) we show that the Krull--Gabriel dimension is s; and (c) we obtain generators for the derived category. This paper will play a key role in subsequent work where we study general modules.