On the depth of quotients of modular invariant rings by transfer ideals

Abstract

Let G be a finite group, and V a finite dimensional vector space over a field k of characteristic dividing the order of G. Let H ≤ G. The transfer map k[V]H → k[V]G is an important feature of modular invariant theory. Its image is called a transfer ideal IGH of k[V]G, and this ideal, along with the quotients k[V]G/IGH are widely studied. In this article we study k[V]G/I, where I is any sum of transfer ideals. Our main result gives an explicit regular sequence of length (VG) in k[V]G/I when G is a p-group. We identify situations where this is sufficient to compute the depth of k[V]G/I, in particular recovering a result of Totaro. We also study the cases where G is cyclic or isomorphic to the Klein 4 group in greater detail. In particular we use our results to compute the depth of k[V]G/IG\1\ for an arbitrary indecomposable representation of the Klein 4-group.